Split (1)

train · 21.9k rows

Context stringlengths 57 85k	file_name stringlengths 21 79	start int64 14 2.42k	end int64 18 2.43k	theorem stringlengths 25 2.71k	proof stringlengths 5 10.6k
import Mathlib.Algebra.Order.Ring.Defs import Mathlib.Algebra.Group.Int import Mathlib.Data.Nat.Dist import Mathlib.Data.Ordmap.Ordnode import Mathlib.Tactic.Abel import Mathlib.Tactic.Linarith #align_import data.ordmap.ordset from "leanprover-community/mathlib"@"47b51515e69f59bca5cf34ef456e6000fe205a69" variable {α : Type} namespace Ordnode theorem not_le_delta {s} (H : 1 ≤ s) : ¬s ≤ delta 0 := not_le_of_gt H #align ordnode.not_le_delta Ordnode.not_le_delta theorem delta_lt_false {a b : ℕ} (h₁ : delta * a < b) (h₂ : delta * b < a) : False := not_le_of_lt (lt_trans ((mul_lt_mul_left (by decide)).2 h₁) h₂) <\| by simpa [mul_assoc] using Nat.mul_le_mul_right a (by decide : 1 ≤ delta * delta) #align ordnode.delta_lt_false Ordnode.delta_lt_false def realSize : Ordnode α → ℕ \| nil => 0 \| node _ l _ r => realSize l + realSize r + 1 #align ordnode.real_size Ordnode.realSize def Sized : Ordnode α → Prop \| nil => True \| node s l _ r => s = size l + size r + 1 ∧ Sized l ∧ Sized r #align ordnode.sized Ordnode.Sized theorem Sized.node' {l x r} (hl : @Sized α l) (hr : Sized r) : Sized (node' l x r) := ⟨rfl, hl, hr⟩ #align ordnode.sized.node' Ordnode.Sized.node' theorem Sized.eq_node' {s l x r} (h : @Sized α (node s l x r)) : node s l x r = .node' l x r := by rw [h.1] #align ordnode.sized.eq_node' Ordnode.Sized.eq_node' theorem Sized.size_eq {s l x r} (H : Sized (@node α s l x r)) : size (@node α s l x r) = size l + size r + 1 := H.1 #align ordnode.sized.size_eq Ordnode.Sized.size_eq @[elab_as_elim] theorem Sized.induction {t} (hl : @Sized α t) {C : Ordnode α → Prop} (H0 : C nil) (H1 : ∀ l x r, C l → C r → C (.node' l x r)) : C t := by induction t with \| nil => exact H0 \| node _ _ _ _ t_ih_l t_ih_r => rw [hl.eq_node'] exact H1 _ _ _ (t_ih_l hl.2.1) (t_ih_r hl.2.2) #align ordnode.sized.induction Ordnode.Sized.induction theorem size_eq_realSize : ∀ {t : Ordnode α}, Sized t → size t = realSize t \| nil, _ => rfl \| node s l x r, ⟨h₁, h₂, h₃⟩ => by rw [size, h₁, size_eq_realSize h₂, size_eq_realSize h₃]; rfl #align ordnode.size_eq_real_size Ordnode.size_eq_realSize @[simp] theorem Sized.size_eq_zero {t : Ordnode α} (ht : Sized t) : size t = 0 ↔ t = nil := by cases t <;> [simp;simp [ht.1]] #align ordnode.sized.size_eq_zero Ordnode.Sized.size_eq_zero theorem Sized.pos {s l x r} (h : Sized (@node α s l x r)) : 0 < s := by rw [h.1]; apply Nat.le_add_left #align ordnode.sized.pos Ordnode.Sized.pos theorem dual_dual : ∀ t : Ordnode α, dual (dual t) = t \| nil => rfl \| node s l x r => by rw [dual, dual, dual_dual l, dual_dual r] #align ordnode.dual_dual Ordnode.dual_dual @[simp] theorem size_dual (t : Ordnode α) : size (dual t) = size t := by cases t <;> rfl #align ordnode.size_dual Ordnode.size_dual def BalancedSz (l r : ℕ) : Prop := l + r ≤ 1 ∨ l ≤ delta * r ∧ r ≤ delta * l #align ordnode.balanced_sz Ordnode.BalancedSz instance BalancedSz.dec : DecidableRel BalancedSz := fun _ _ => Or.decidable #align ordnode.balanced_sz.dec Ordnode.BalancedSz.dec def Balanced : Ordnode α → Prop \| nil => True \| node _ l _ r => BalancedSz (size l) (size r) ∧ Balanced l ∧ Balanced r #align ordnode.balanced Ordnode.Balanced instance Balanced.dec : DecidablePred (@Balanced α) \| nil => by unfold Balanced infer_instance \| node _ l _ r => by unfold Balanced haveI := Balanced.dec l haveI := Balanced.dec r infer_instance #align ordnode.balanced.dec Ordnode.Balanced.dec @[symm] theorem BalancedSz.symm {l r : ℕ} : BalancedSz l r → BalancedSz r l := Or.imp (by rw [add_comm]; exact id) And.symm #align ordnode.balanced_sz.symm Ordnode.BalancedSz.symm theorem balancedSz_zero {l : ℕ} : BalancedSz l 0 ↔ l ≤ 1 := by simp (config := { contextual := true }) [BalancedSz] #align ordnode.balanced_sz_zero Ordnode.balancedSz_zero theorem balancedSz_up {l r₁ r₂ : ℕ} (h₁ : r₁ ≤ r₂) (h₂ : l + r₂ ≤ 1 ∨ r₂ ≤ delta * l) (H : BalancedSz l r₁) : BalancedSz l r₂ := by refine or_iff_not_imp_left.2 fun h => ?_ refine ⟨?_, h₂.resolve_left h⟩ cases H with \| inl H => cases r₂ · cases h (le_trans (Nat.add_le_add_left (Nat.zero_le _) _) H) · exact le_trans (le_trans (Nat.le_add_right _ _) H) (Nat.le_add_left 1 _) \| inr H => exact le_trans H.1 (Nat.mul_le_mul_left _ h₁) #align ordnode.balanced_sz_up Ordnode.balancedSz_up theorem balancedSz_down {l r₁ r₂ : ℕ} (h₁ : r₁ ≤ r₂) (h₂ : l + r₂ ≤ 1 ∨ l ≤ delta * r₁) (H : BalancedSz l r₂) : BalancedSz l r₁ := have : l + r₂ ≤ 1 → BalancedSz l r₁ := fun H => Or.inl (le_trans (Nat.add_le_add_left h₁ _) H) Or.casesOn H this fun H => Or.casesOn h₂ this fun h₂ => Or.inr ⟨h₂, le_trans h₁ H.2⟩ #align ordnode.balanced_sz_down Ordnode.balancedSz_down theorem Balanced.dual : ∀ {t : Ordnode α}, Balanced t → Balanced (dual t) \| nil, _ => ⟨⟩ \| node _ l _ r, ⟨b, bl, br⟩ => ⟨by rw [size_dual, size_dual]; exact b.symm, br.dual, bl.dual⟩ #align ordnode.balanced.dual Ordnode.Balanced.dual def node3L (l : Ordnode α) (x : α) (m : Ordnode α) (y : α) (r : Ordnode α) : Ordnode α := node' (node' l x m) y r #align ordnode.node3_l Ordnode.node3L def node3R (l : Ordnode α) (x : α) (m : Ordnode α) (y : α) (r : Ordnode α) : Ordnode α := node' l x (node' m y r) #align ordnode.node3_r Ordnode.node3R def node4L : Ordnode α → α → Ordnode α → α → Ordnode α → Ordnode α \| l, x, node _ ml y mr, z, r => node' (node' l x ml) y (node' mr z r) \| l, x, nil, z, r => node3L l x nil z r #align ordnode.node4_l Ordnode.node4L -- should not happen def node4R : Ordnode α → α → Ordnode α → α → Ordnode α → Ordnode α \| l, x, node _ ml y mr, z, r => node' (node' l x ml) y (node' mr z r) \| l, x, nil, z, r => node3R l x nil z r #align ordnode.node4_r Ordnode.node4R -- should not happen def rotateL : Ordnode α → α → Ordnode α → Ordnode α \| l, x, node _ m y r => if size m < ratio * size r then node3L l x m y r else node4L l x m y r \| l, x, nil => node' l x nil #align ordnode.rotate_l Ordnode.rotateL -- Porting note (#11467): during the port we marked these lemmas with `@[eqns]` -- to emulate the old Lean 3 behaviour. theorem rotateL_node (l : Ordnode α) (x : α) (sz : ℕ) (m : Ordnode α) (y : α) (r : Ordnode α) : rotateL l x (node sz m y r) = if size m < ratio * size r then node3L l x m y r else node4L l x m y r := rfl theorem rotateL_nil (l : Ordnode α) (x : α) : rotateL l x nil = node' l x nil := rfl -- should not happen def rotateR : Ordnode α → α → Ordnode α → Ordnode α \| node _ l x m, y, r => if size m < ratio * size l then node3R l x m y r else node4R l x m y r \| nil, y, r => node' nil y r #align ordnode.rotate_r Ordnode.rotateR -- Porting note (#11467): during the port we marked these lemmas with `@[eqns]` -- to emulate the old Lean 3 behaviour. theorem rotateR_node (sz : ℕ) (l : Ordnode α) (x : α) (m : Ordnode α) (y : α) (r : Ordnode α) : rotateR (node sz l x m) y r = if size m < ratio * size l then node3R l x m y r else node4R l x m y r := rfl theorem rotateR_nil (y : α) (r : Ordnode α) : rotateR nil y r = node' nil y r := rfl -- should not happen def balanceL' (l : Ordnode α) (x : α) (r : Ordnode α) : Ordnode α := if size l + size r ≤ 1 then node' l x r else if size l > delta * size r then rotateR l x r else node' l x r #align ordnode.balance_l' Ordnode.balanceL' def balanceR' (l : Ordnode α) (x : α) (r : Ordnode α) : Ordnode α := if size l + size r ≤ 1 then node' l x r else if size r > delta * size l then rotateL l x r else node' l x r #align ordnode.balance_r' Ordnode.balanceR' def balance' (l : Ordnode α) (x : α) (r : Ordnode α) : Ordnode α := if size l + size r ≤ 1 then node' l x r else if size r > delta * size l then rotateL l x r else if size l > delta * size r then rotateR l x r else node' l x r #align ordnode.balance' Ordnode.balance' theorem dual_node' (l : Ordnode α) (x : α) (r : Ordnode α) : dual (node' l x r) = node' (dual r) x (dual l) := by simp [node', add_comm] #align ordnode.dual_node' Ordnode.dual_node' theorem dual_node3L (l : Ordnode α) (x : α) (m : Ordnode α) (y : α) (r : Ordnode α) : dual (node3L l x m y r) = node3R (dual r) y (dual m) x (dual l) := by simp [node3L, node3R, dual_node', add_comm] #align ordnode.dual_node3_l Ordnode.dual_node3L theorem dual_node3R (l : Ordnode α) (x : α) (m : Ordnode α) (y : α) (r : Ordnode α) : dual (node3R l x m y r) = node3L (dual r) y (dual m) x (dual l) := by simp [node3L, node3R, dual_node', add_comm] #align ordnode.dual_node3_r Ordnode.dual_node3R theorem dual_node4L (l : Ordnode α) (x : α) (m : Ordnode α) (y : α) (r : Ordnode α) : dual (node4L l x m y r) = node4R (dual r) y (dual m) x (dual l) := by cases m <;> simp [node4L, node4R, node3R, dual_node3L, dual_node', add_comm] #align ordnode.dual_node4_l Ordnode.dual_node4L theorem dual_node4R (l : Ordnode α) (x : α) (m : Ordnode α) (y : α) (r : Ordnode α) : dual (node4R l x m y r) = node4L (dual r) y (dual m) x (dual l) := by cases m <;> simp [node4L, node4R, node3L, dual_node3R, dual_node', add_comm] #align ordnode.dual_node4_r Ordnode.dual_node4R theorem dual_rotateL (l : Ordnode α) (x : α) (r : Ordnode α) : dual (rotateL l x r) = rotateR (dual r) x (dual l) := by cases r <;> simp [rotateL, rotateR, dual_node']; split_ifs <;> simp [dual_node3L, dual_node4L, node3R, add_comm] #align ordnode.dual_rotate_l Ordnode.dual_rotateL theorem dual_rotateR (l : Ordnode α) (x : α) (r : Ordnode α) : dual (rotateR l x r) = rotateL (dual r) x (dual l) := by rw [← dual_dual (rotateL _ _ _), dual_rotateL, dual_dual, dual_dual] #align ordnode.dual_rotate_r Ordnode.dual_rotateR theorem dual_balance' (l : Ordnode α) (x : α) (r : Ordnode α) : dual (balance' l x r) = balance' (dual r) x (dual l) := by simp [balance', add_comm]; split_ifs with h h_1 h_2 <;> simp [dual_node', dual_rotateL, dual_rotateR, add_comm] cases delta_lt_false h_1 h_2 #align ordnode.dual_balance' Ordnode.dual_balance' theorem dual_balanceL (l : Ordnode α) (x : α) (r : Ordnode α) : dual (balanceL l x r) = balanceR (dual r) x (dual l) := by unfold balanceL balanceR cases' r with rs rl rx rr · cases' l with ls ll lx lr; · rfl cases' ll with lls lll llx llr <;> cases' lr with lrs lrl lrx lrr <;> dsimp only [dual, id] <;> try rfl split_ifs with h <;> repeat simp [h, add_comm] · cases' l with ls ll lx lr; · rfl dsimp only [dual, id] split_ifs; swap; · simp [add_comm] cases' ll with lls lll llx llr <;> cases' lr with lrs lrl lrx lrr <;> try rfl dsimp only [dual, id] split_ifs with h <;> simp [h, add_comm] #align ordnode.dual_balance_l Ordnode.dual_balanceL	Mathlib/Data/Ordmap/Ordset.lean	370	372	theorem dual_balanceR (l : Ordnode α) (x : α) (r : Ordnode α) : dual (balanceR l x r) = balanceL (dual r) x (dual l) := by	rw [← dual_dual (balanceL _ _ _), dual_balanceL, dual_dual, dual_dual]
import Mathlib.Algebra.CharP.Invertible import Mathlib.Algebra.Order.Interval.Set.Group import Mathlib.Analysis.Convex.Segment import Mathlib.LinearAlgebra.AffineSpace.FiniteDimensional import Mathlib.Tactic.FieldSimp #align_import analysis.convex.between from "leanprover-community/mathlib"@"571e13cacbed7bf042fd3058ce27157101433842" variable (R : Type) {V V' P P' : Type} open AffineEquiv AffineMap section OrderedRing variable [OrderedRing R] [AddCommGroup V] [Module R V] [AddTorsor V P] variable [AddCommGroup V'] [Module R V'] [AddTorsor V' P'] def affineSegment (x y : P) := lineMap x y '' Set.Icc (0 : R) 1 #align affine_segment affineSegment theorem affineSegment_eq_segment (x y : V) : affineSegment R x y = segment R x y := by rw [segment_eq_image_lineMap, affineSegment] #align affine_segment_eq_segment affineSegment_eq_segment theorem affineSegment_comm (x y : P) : affineSegment R x y = affineSegment R y x := by refine Set.ext fun z => ?_ constructor <;> · rintro ⟨t, ht, hxy⟩ refine ⟨1 - t, ?_, ?_⟩ · rwa [Set.sub_mem_Icc_iff_right, sub_self, sub_zero] · rwa [lineMap_apply_one_sub] #align affine_segment_comm affineSegment_comm theorem left_mem_affineSegment (x y : P) : x ∈ affineSegment R x y := ⟨0, Set.left_mem_Icc.2 zero_le_one, lineMap_apply_zero _ _⟩ #align left_mem_affine_segment left_mem_affineSegment theorem right_mem_affineSegment (x y : P) : y ∈ affineSegment R x y := ⟨1, Set.right_mem_Icc.2 zero_le_one, lineMap_apply_one _ _⟩ #align right_mem_affine_segment right_mem_affineSegment @[simp] theorem affineSegment_same (x : P) : affineSegment R x x = {x} := by -- Porting note: added as this doesn't do anything in `simp_rw` any more rw [affineSegment] -- Note: when adding "simp made no progress" in lean4#2336, -- had to change `lineMap_same` to `lineMap_same _`. Not sure why? -- Porting note: added `_ _` and `Function.const` simp_rw [lineMap_same _, AffineMap.coe_const _ _, Function.const, (Set.nonempty_Icc.mpr zero_le_one).image_const] #align affine_segment_same affineSegment_same variable {R} @[simp] theorem affineSegment_image (f : P →ᵃ[R] P') (x y : P) : f '' affineSegment R x y = affineSegment R (f x) (f y) := by rw [affineSegment, affineSegment, Set.image_image, ← comp_lineMap] rfl #align affine_segment_image affineSegment_image variable (R) @[simp] theorem affineSegment_const_vadd_image (x y : P) (v : V) : (v +ᵥ ·) '' affineSegment R x y = affineSegment R (v +ᵥ x) (v +ᵥ y) := affineSegment_image (AffineEquiv.constVAdd R P v : P →ᵃ[R] P) x y #align affine_segment_const_vadd_image affineSegment_const_vadd_image @[simp] theorem affineSegment_vadd_const_image (x y : V) (p : P) : (· +ᵥ p) '' affineSegment R x y = affineSegment R (x +ᵥ p) (y +ᵥ p) := affineSegment_image (AffineEquiv.vaddConst R p : V →ᵃ[R] P) x y #align affine_segment_vadd_const_image affineSegment_vadd_const_image @[simp] theorem affineSegment_const_vsub_image (x y p : P) : (p -ᵥ ·) '' affineSegment R x y = affineSegment R (p -ᵥ x) (p -ᵥ y) := affineSegment_image (AffineEquiv.constVSub R p : P →ᵃ[R] V) x y #align affine_segment_const_vsub_image affineSegment_const_vsub_image @[simp] theorem affineSegment_vsub_const_image (x y p : P) : (· -ᵥ p) '' affineSegment R x y = affineSegment R (x -ᵥ p) (y -ᵥ p) := affineSegment_image ((AffineEquiv.vaddConst R p).symm : P →ᵃ[R] V) x y #align affine_segment_vsub_const_image affineSegment_vsub_const_image variable {R} @[simp] theorem mem_const_vadd_affineSegment {x y z : P} (v : V) : v +ᵥ z ∈ affineSegment R (v +ᵥ x) (v +ᵥ y) ↔ z ∈ affineSegment R x y := by rw [← affineSegment_const_vadd_image, (AddAction.injective v).mem_set_image] #align mem_const_vadd_affine_segment mem_const_vadd_affineSegment @[simp] theorem mem_vadd_const_affineSegment {x y z : V} (p : P) : z +ᵥ p ∈ affineSegment R (x +ᵥ p) (y +ᵥ p) ↔ z ∈ affineSegment R x y := by rw [← affineSegment_vadd_const_image, (vadd_right_injective p).mem_set_image] #align mem_vadd_const_affine_segment mem_vadd_const_affineSegment @[simp] theorem mem_const_vsub_affineSegment {x y z : P} (p : P) : p -ᵥ z ∈ affineSegment R (p -ᵥ x) (p -ᵥ y) ↔ z ∈ affineSegment R x y := by rw [← affineSegment_const_vsub_image, (vsub_right_injective p).mem_set_image] #align mem_const_vsub_affine_segment mem_const_vsub_affineSegment @[simp] theorem mem_vsub_const_affineSegment {x y z : P} (p : P) : z -ᵥ p ∈ affineSegment R (x -ᵥ p) (y -ᵥ p) ↔ z ∈ affineSegment R x y := by rw [← affineSegment_vsub_const_image, (vsub_left_injective p).mem_set_image] #align mem_vsub_const_affine_segment mem_vsub_const_affineSegment variable (R) def Wbtw (x y z : P) : Prop := y ∈ affineSegment R x z #align wbtw Wbtw def Sbtw (x y z : P) : Prop := Wbtw R x y z ∧ y ≠ x ∧ y ≠ z #align sbtw Sbtw variable {R} lemma mem_segment_iff_wbtw {x y z : V} : y ∈ segment R x z ↔ Wbtw R x y z := by rw [Wbtw, affineSegment_eq_segment] theorem Wbtw.map {x y z : P} (h : Wbtw R x y z) (f : P →ᵃ[R] P') : Wbtw R (f x) (f y) (f z) := by rw [Wbtw, ← affineSegment_image] exact Set.mem_image_of_mem _ h #align wbtw.map Wbtw.map theorem Function.Injective.wbtw_map_iff {x y z : P} {f : P →ᵃ[R] P'} (hf : Function.Injective f) : Wbtw R (f x) (f y) (f z) ↔ Wbtw R x y z := by refine ⟨fun h => ?_, fun h => h.map _⟩ rwa [Wbtw, ← affineSegment_image, hf.mem_set_image] at h #align function.injective.wbtw_map_iff Function.Injective.wbtw_map_iff theorem Function.Injective.sbtw_map_iff {x y z : P} {f : P →ᵃ[R] P'} (hf : Function.Injective f) : Sbtw R (f x) (f y) (f z) ↔ Sbtw R x y z := by simp_rw [Sbtw, hf.wbtw_map_iff, hf.ne_iff] #align function.injective.sbtw_map_iff Function.Injective.sbtw_map_iff @[simp] theorem AffineEquiv.wbtw_map_iff {x y z : P} (f : P ≃ᵃ[R] P') : Wbtw R (f x) (f y) (f z) ↔ Wbtw R x y z := by refine Function.Injective.wbtw_map_iff (?_ : Function.Injective f.toAffineMap) exact f.injective #align affine_equiv.wbtw_map_iff AffineEquiv.wbtw_map_iff @[simp] theorem AffineEquiv.sbtw_map_iff {x y z : P} (f : P ≃ᵃ[R] P') : Sbtw R (f x) (f y) (f z) ↔ Sbtw R x y z := by refine Function.Injective.sbtw_map_iff (?_ : Function.Injective f.toAffineMap) exact f.injective #align affine_equiv.sbtw_map_iff AffineEquiv.sbtw_map_iff @[simp] theorem wbtw_const_vadd_iff {x y z : P} (v : V) : Wbtw R (v +ᵥ x) (v +ᵥ y) (v +ᵥ z) ↔ Wbtw R x y z := mem_const_vadd_affineSegment _ #align wbtw_const_vadd_iff wbtw_const_vadd_iff @[simp] theorem wbtw_vadd_const_iff {x y z : V} (p : P) : Wbtw R (x +ᵥ p) (y +ᵥ p) (z +ᵥ p) ↔ Wbtw R x y z := mem_vadd_const_affineSegment _ #align wbtw_vadd_const_iff wbtw_vadd_const_iff @[simp] theorem wbtw_const_vsub_iff {x y z : P} (p : P) : Wbtw R (p -ᵥ x) (p -ᵥ y) (p -ᵥ z) ↔ Wbtw R x y z := mem_const_vsub_affineSegment _ #align wbtw_const_vsub_iff wbtw_const_vsub_iff @[simp] theorem wbtw_vsub_const_iff {x y z : P} (p : P) : Wbtw R (x -ᵥ p) (y -ᵥ p) (z -ᵥ p) ↔ Wbtw R x y z := mem_vsub_const_affineSegment _ #align wbtw_vsub_const_iff wbtw_vsub_const_iff @[simp] theorem sbtw_const_vadd_iff {x y z : P} (v : V) : Sbtw R (v +ᵥ x) (v +ᵥ y) (v +ᵥ z) ↔ Sbtw R x y z := by rw [Sbtw, Sbtw, wbtw_const_vadd_iff, (AddAction.injective v).ne_iff, (AddAction.injective v).ne_iff] #align sbtw_const_vadd_iff sbtw_const_vadd_iff @[simp] theorem sbtw_vadd_const_iff {x y z : V} (p : P) : Sbtw R (x +ᵥ p) (y +ᵥ p) (z +ᵥ p) ↔ Sbtw R x y z := by rw [Sbtw, Sbtw, wbtw_vadd_const_iff, (vadd_right_injective p).ne_iff, (vadd_right_injective p).ne_iff] #align sbtw_vadd_const_iff sbtw_vadd_const_iff @[simp] theorem sbtw_const_vsub_iff {x y z : P} (p : P) : Sbtw R (p -ᵥ x) (p -ᵥ y) (p -ᵥ z) ↔ Sbtw R x y z := by rw [Sbtw, Sbtw, wbtw_const_vsub_iff, (vsub_right_injective p).ne_iff, (vsub_right_injective p).ne_iff] #align sbtw_const_vsub_iff sbtw_const_vsub_iff @[simp] theorem sbtw_vsub_const_iff {x y z : P} (p : P) : Sbtw R (x -ᵥ p) (y -ᵥ p) (z -ᵥ p) ↔ Sbtw R x y z := by rw [Sbtw, Sbtw, wbtw_vsub_const_iff, (vsub_left_injective p).ne_iff, (vsub_left_injective p).ne_iff] #align sbtw_vsub_const_iff sbtw_vsub_const_iff theorem Sbtw.wbtw {x y z : P} (h : Sbtw R x y z) : Wbtw R x y z := h.1 #align sbtw.wbtw Sbtw.wbtw theorem Sbtw.ne_left {x y z : P} (h : Sbtw R x y z) : y ≠ x := h.2.1 #align sbtw.ne_left Sbtw.ne_left theorem Sbtw.left_ne {x y z : P} (h : Sbtw R x y z) : x ≠ y := h.2.1.symm #align sbtw.left_ne Sbtw.left_ne theorem Sbtw.ne_right {x y z : P} (h : Sbtw R x y z) : y ≠ z := h.2.2 #align sbtw.ne_right Sbtw.ne_right theorem Sbtw.right_ne {x y z : P} (h : Sbtw R x y z) : z ≠ y := h.2.2.symm #align sbtw.right_ne Sbtw.right_ne theorem Sbtw.mem_image_Ioo {x y z : P} (h : Sbtw R x y z) : y ∈ lineMap x z '' Set.Ioo (0 : R) 1 := by rcases h with ⟨⟨t, ht, rfl⟩, hyx, hyz⟩ rcases Set.eq_endpoints_or_mem_Ioo_of_mem_Icc ht with (rfl \| rfl \| ho) · exfalso exact hyx (lineMap_apply_zero _ _) · exfalso exact hyz (lineMap_apply_one _ _) · exact ⟨t, ho, rfl⟩ #align sbtw.mem_image_Ioo Sbtw.mem_image_Ioo	Mathlib/Analysis/Convex/Between.lean	268	270	theorem Wbtw.mem_affineSpan {x y z : P} (h : Wbtw R x y z) : y ∈ line[R, x, z] := by	rcases h with ⟨r, ⟨-, rfl⟩⟩ exact lineMap_mem_affineSpan_pair _ _ _
import Mathlib.Data.Matrix.Basic #align_import data.matrix.block from "leanprover-community/mathlib"@"c060baa79af5ca092c54b8bf04f0f10592f59489" variable {l m n o p q : Type} {m' n' p' : o → Type} variable {R : Type} {S : Type} {α : Type} {β : Type} open Matrix namespace Matrix theorem dotProduct_block [Fintype m] [Fintype n] [Mul α] [AddCommMonoid α] (v w : Sum m n → α) : v ⬝ᵥ w = v ∘ Sum.inl ⬝ᵥ w ∘ Sum.inl + v ∘ Sum.inr ⬝ᵥ w ∘ Sum.inr := Fintype.sum_sum_type _ #align matrix.dot_product_block Matrix.dotProduct_block section BlockMatrices -- @[pp_nodot] -- Porting note: removed def fromBlocks (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : Matrix (Sum n o) (Sum l m) α := of <\| Sum.elim (fun i => Sum.elim (A i) (B i)) fun i => Sum.elim (C i) (D i) #align matrix.from_blocks Matrix.fromBlocks @[simp] theorem fromBlocks_apply₁₁ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (i : n) (j : l) : fromBlocks A B C D (Sum.inl i) (Sum.inl j) = A i j := rfl #align matrix.from_blocks_apply₁₁ Matrix.fromBlocks_apply₁₁ @[simp] theorem fromBlocks_apply₁₂ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (i : n) (j : m) : fromBlocks A B C D (Sum.inl i) (Sum.inr j) = B i j := rfl #align matrix.from_blocks_apply₁₂ Matrix.fromBlocks_apply₁₂ @[simp] theorem fromBlocks_apply₂₁ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (i : o) (j : l) : fromBlocks A B C D (Sum.inr i) (Sum.inl j) = C i j := rfl #align matrix.from_blocks_apply₂₁ Matrix.fromBlocks_apply₂₁ @[simp] theorem fromBlocks_apply₂₂ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (i : o) (j : m) : fromBlocks A B C D (Sum.inr i) (Sum.inr j) = D i j := rfl #align matrix.from_blocks_apply₂₂ Matrix.fromBlocks_apply₂₂ def toBlocks₁₁ (M : Matrix (Sum n o) (Sum l m) α) : Matrix n l α := of fun i j => M (Sum.inl i) (Sum.inl j) #align matrix.to_blocks₁₁ Matrix.toBlocks₁₁ def toBlocks₁₂ (M : Matrix (Sum n o) (Sum l m) α) : Matrix n m α := of fun i j => M (Sum.inl i) (Sum.inr j) #align matrix.to_blocks₁₂ Matrix.toBlocks₁₂ def toBlocks₂₁ (M : Matrix (Sum n o) (Sum l m) α) : Matrix o l α := of fun i j => M (Sum.inr i) (Sum.inl j) #align matrix.to_blocks₂₁ Matrix.toBlocks₂₁ def toBlocks₂₂ (M : Matrix (Sum n o) (Sum l m) α) : Matrix o m α := of fun i j => M (Sum.inr i) (Sum.inr j) #align matrix.to_blocks₂₂ Matrix.toBlocks₂₂ theorem fromBlocks_toBlocks (M : Matrix (Sum n o) (Sum l m) α) : fromBlocks M.toBlocks₁₁ M.toBlocks₁₂ M.toBlocks₂₁ M.toBlocks₂₂ = M := by ext i j rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> rfl #align matrix.from_blocks_to_blocks Matrix.fromBlocks_toBlocks @[simp] theorem toBlocks_fromBlocks₁₁ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D).toBlocks₁₁ = A := rfl #align matrix.to_blocks_from_blocks₁₁ Matrix.toBlocks_fromBlocks₁₁ @[simp] theorem toBlocks_fromBlocks₁₂ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D).toBlocks₁₂ = B := rfl #align matrix.to_blocks_from_blocks₁₂ Matrix.toBlocks_fromBlocks₁₂ @[simp] theorem toBlocks_fromBlocks₂₁ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D).toBlocks₂₁ = C := rfl #align matrix.to_blocks_from_blocks₂₁ Matrix.toBlocks_fromBlocks₂₁ @[simp] theorem toBlocks_fromBlocks₂₂ (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D).toBlocks₂₂ = D := rfl #align matrix.to_blocks_from_blocks₂₂ Matrix.toBlocks_fromBlocks₂₂ theorem ext_iff_blocks {A B : Matrix (Sum n o) (Sum l m) α} : A = B ↔ A.toBlocks₁₁ = B.toBlocks₁₁ ∧ A.toBlocks₁₂ = B.toBlocks₁₂ ∧ A.toBlocks₂₁ = B.toBlocks₂₁ ∧ A.toBlocks₂₂ = B.toBlocks₂₂ := ⟨fun h => h ▸ ⟨rfl, rfl, rfl, rfl⟩, fun ⟨h₁₁, h₁₂, h₂₁, h₂₂⟩ => by rw [← fromBlocks_toBlocks A, ← fromBlocks_toBlocks B, h₁₁, h₁₂, h₂₁, h₂₂]⟩ #align matrix.ext_iff_blocks Matrix.ext_iff_blocks @[simp] theorem fromBlocks_inj {A : Matrix n l α} {B : Matrix n m α} {C : Matrix o l α} {D : Matrix o m α} {A' : Matrix n l α} {B' : Matrix n m α} {C' : Matrix o l α} {D' : Matrix o m α} : fromBlocks A B C D = fromBlocks A' B' C' D' ↔ A = A' ∧ B = B' ∧ C = C' ∧ D = D' := ext_iff_blocks #align matrix.from_blocks_inj Matrix.fromBlocks_inj theorem fromBlocks_map (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) (f : α → β) : (fromBlocks A B C D).map f = fromBlocks (A.map f) (B.map f) (C.map f) (D.map f) := by ext i j; rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> simp [fromBlocks] #align matrix.from_blocks_map Matrix.fromBlocks_map theorem fromBlocks_transpose (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D)ᵀ = fromBlocks Aᵀ Cᵀ Bᵀ Dᵀ := by ext i j rcases i with ⟨⟩ <;> rcases j with ⟨⟩ <;> simp [fromBlocks] #align matrix.from_blocks_transpose Matrix.fromBlocks_transpose	Mathlib/Data/Matrix/Block.lean	155	157	theorem fromBlocks_conjTranspose [Star α] (A : Matrix n l α) (B : Matrix n m α) (C : Matrix o l α) (D : Matrix o m α) : (fromBlocks A B C D)ᴴ = fromBlocks Aᴴ Cᴴ Bᴴ Dᴴ := by	simp only [conjTranspose, fromBlocks_transpose, fromBlocks_map]
import Mathlib.Analysis.Convex.Body import Mathlib.Analysis.Convex.Measure import Mathlib.MeasureTheory.Group.FundamentalDomain #align_import measure_theory.group.geometry_of_numbers from "leanprover-community/mathlib"@"fd5edc43dc4f10b85abfe544b88f82cf13c5f844" namespace MeasureTheory open ENNReal FiniteDimensional MeasureTheory MeasureTheory.Measure Set Filter open scoped Pointwise NNReal variable {E L : Type*} [MeasurableSpace E] {μ : Measure E} {F s : Set E}	Mathlib/MeasureTheory/Group/GeometryOfNumbers.lean	50	58	theorem exists_pair_mem_lattice_not_disjoint_vadd [AddCommGroup L] [Countable L] [AddAction L E] [MeasurableSpace L] [MeasurableVAdd L E] [VAddInvariantMeasure L E μ] (fund : IsAddFundamentalDomain L F μ) (hS : NullMeasurableSet s μ) (h : μ F < μ s) : ∃ x y : L, x ≠ y ∧ ¬Disjoint (x +ᵥ s) (y +ᵥ s) := by	contrapose! h exact ((fund.measure_eq_tsum _).trans (measure_iUnion₀ (Pairwise.mono h fun i j hij => (hij.mono inf_le_left inf_le_left).aedisjoint) fun _ => (hS.vadd _).inter fund.nullMeasurableSet).symm).trans_le (measure_mono <\| Set.iUnion_subset fun _ => Set.inter_subset_right)
import Mathlib.Algebra.Polynomial.Basic import Mathlib.FieldTheory.IsAlgClosed.Basic #align_import linear_algebra.matrix.charpoly.eigs from "leanprover-community/mathlib"@"48dc6abe71248bd6f4bffc9703dc87bdd4e37d0b" variable {n : Type} [Fintype n] [DecidableEq n] variable {R : Type} [Field R] variable {A : Matrix n n R} open Matrix Polynomial open scoped Matrix namespace Matrix theorem det_eq_prod_roots_charpoly_of_splits (hAps : A.charpoly.Splits (RingHom.id R)) : A.det = (Matrix.charpoly A).roots.prod := by rw [det_eq_sign_charpoly_coeff, ← charpoly_natDegree_eq_dim A, Polynomial.prod_roots_eq_coeff_zero_of_monic_of_split A.charpoly_monic hAps, ← mul_assoc, ← pow_two, pow_right_comm, neg_one_sq, one_pow, one_mul] #align matrix.det_eq_prod_roots_charpoly_of_splits Matrix.det_eq_prod_roots_charpoly_of_splits	Mathlib/LinearAlgebra/Matrix/Charpoly/Eigs.lean	67	75	theorem trace_eq_sum_roots_charpoly_of_splits (hAps : A.charpoly.Splits (RingHom.id R)) : A.trace = (Matrix.charpoly A).roots.sum := by	cases' isEmpty_or_nonempty n with h · rw [Matrix.trace, Fintype.sum_empty, Matrix.charpoly, det_eq_one_of_card_eq_zero (Fintype.card_eq_zero_iff.2 h), Polynomial.roots_one, Multiset.empty_eq_zero, Multiset.sum_zero] · rw [trace_eq_neg_charpoly_coeff, neg_eq_iff_eq_neg, ← Polynomial.sum_roots_eq_nextCoeff_of_monic_of_split A.charpoly_monic hAps, nextCoeff, charpoly_natDegree_eq_dim, if_neg (Fintype.card_ne_zero : Fintype.card n ≠ 0)]
import Mathlib.Data.Stream.Defs import Mathlib.Logic.Function.Basic import Mathlib.Init.Data.List.Basic import Mathlib.Data.List.Basic #align_import data.stream.init from "leanprover-community/mathlib"@"207cfac9fcd06138865b5d04f7091e46d9320432" set_option autoImplicit true open Nat Function Option namespace Stream' variable {α : Type u} {β : Type v} {δ : Type w} instance [Inhabited α] : Inhabited (Stream' α) := ⟨Stream'.const default⟩ protected theorem eta (s : Stream' α) : (head s::tail s) = s := funext fun i => by cases i <;> rfl #align stream.eta Stream'.eta @[ext] protected theorem ext {s₁ s₂ : Stream' α} : (∀ n, get s₁ n = get s₂ n) → s₁ = s₂ := fun h => funext h #align stream.ext Stream'.ext @[simp] theorem get_zero_cons (a : α) (s : Stream' α) : get (a::s) 0 = a := rfl #align stream.nth_zero_cons Stream'.get_zero_cons @[simp] theorem head_cons (a : α) (s : Stream' α) : head (a::s) = a := rfl #align stream.head_cons Stream'.head_cons @[simp] theorem tail_cons (a : α) (s : Stream' α) : tail (a::s) = s := rfl #align stream.tail_cons Stream'.tail_cons @[simp] theorem get_drop (n m : Nat) (s : Stream' α) : get (drop m s) n = get s (n + m) := rfl #align stream.nth_drop Stream'.get_drop theorem tail_eq_drop (s : Stream' α) : tail s = drop 1 s := rfl #align stream.tail_eq_drop Stream'.tail_eq_drop @[simp] theorem drop_drop (n m : Nat) (s : Stream' α) : drop n (drop m s) = drop (n + m) s := by ext; simp [Nat.add_assoc] #align stream.drop_drop Stream'.drop_drop @[simp] theorem get_tail {s : Stream' α} : s.tail.get n = s.get (n + 1) := rfl @[simp] theorem tail_drop' {s : Stream' α} : tail (drop i s) = s.drop (i+1) := by ext; simp [Nat.add_comm, Nat.add_assoc, Nat.add_left_comm] @[simp] theorem drop_tail' {s : Stream' α} : drop i (tail s) = s.drop (i+1) := rfl theorem tail_drop (n : Nat) (s : Stream' α) : tail (drop n s) = drop n (tail s) := by simp #align stream.tail_drop Stream'.tail_drop theorem get_succ (n : Nat) (s : Stream' α) : get s (succ n) = get (tail s) n := rfl #align stream.nth_succ Stream'.get_succ @[simp] theorem get_succ_cons (n : Nat) (s : Stream' α) (x : α) : get (x::s) n.succ = get s n := rfl #align stream.nth_succ_cons Stream'.get_succ_cons @[simp] theorem drop_zero {s : Stream' α} : s.drop 0 = s := rfl theorem drop_succ (n : Nat) (s : Stream' α) : drop (succ n) s = drop n (tail s) := rfl #align stream.drop_succ Stream'.drop_succ theorem head_drop (a : Stream' α) (n : ℕ) : (a.drop n).head = a.get n := by simp #align stream.head_drop Stream'.head_drop theorem cons_injective2 : Function.Injective2 (cons : α → Stream' α → Stream' α) := fun x y s t h => ⟨by rw [← get_zero_cons x s, h, get_zero_cons], Stream'.ext fun n => by rw [← get_succ_cons n _ x, h, get_succ_cons]⟩ #align stream.cons_injective2 Stream'.cons_injective2 theorem cons_injective_left (s : Stream' α) : Function.Injective fun x => cons x s := cons_injective2.left _ #align stream.cons_injective_left Stream'.cons_injective_left theorem cons_injective_right (x : α) : Function.Injective (cons x) := cons_injective2.right _ #align stream.cons_injective_right Stream'.cons_injective_right theorem all_def (p : α → Prop) (s : Stream' α) : All p s = ∀ n, p (get s n) := rfl #align stream.all_def Stream'.all_def theorem any_def (p : α → Prop) (s : Stream' α) : Any p s = ∃ n, p (get s n) := rfl #align stream.any_def Stream'.any_def @[simp] theorem mem_cons (a : α) (s : Stream' α) : a ∈ a::s := Exists.intro 0 rfl #align stream.mem_cons Stream'.mem_cons theorem mem_cons_of_mem {a : α} {s : Stream' α} (b : α) : a ∈ s → a ∈ b::s := fun ⟨n, h⟩ => Exists.intro (succ n) (by rw [get_succ, tail_cons, h]) #align stream.mem_cons_of_mem Stream'.mem_cons_of_mem theorem eq_or_mem_of_mem_cons {a b : α} {s : Stream' α} : (a ∈ b::s) → a = b ∨ a ∈ s := fun ⟨n, h⟩ => by cases' n with n' · left exact h · right rw [get_succ, tail_cons] at h exact ⟨n', h⟩ #align stream.eq_or_mem_of_mem_cons Stream'.eq_or_mem_of_mem_cons theorem mem_of_get_eq {n : Nat} {s : Stream' α} {a : α} : a = get s n → a ∈ s := fun h => Exists.intro n h #align stream.mem_of_nth_eq Stream'.mem_of_get_eq section Map variable (f : α → β) theorem drop_map (n : Nat) (s : Stream' α) : drop n (map f s) = map f (drop n s) := Stream'.ext fun _ => rfl #align stream.drop_map Stream'.drop_map @[simp] theorem get_map (n : Nat) (s : Stream' α) : get (map f s) n = f (get s n) := rfl #align stream.nth_map Stream'.get_map theorem tail_map (s : Stream' α) : tail (map f s) = map f (tail s) := rfl #align stream.tail_map Stream'.tail_map @[simp] theorem head_map (s : Stream' α) : head (map f s) = f (head s) := rfl #align stream.head_map Stream'.head_map	Mathlib/Data/Stream/Init.lean	162	163	theorem map_eq (s : Stream' α) : map f s = f (head s)::map f (tail s) := by	rw [← Stream'.eta (map f s), tail_map, head_map]
import Mathlib.Combinatorics.SimpleGraph.Coloring #align_import combinatorics.simple_graph.partition from "leanprover-community/mathlib"@"2303b3e299f1c75b07bceaaac130ce23044d1386" universe u v namespace SimpleGraph variable {V : Type u} (G : SimpleGraph V) structure Partition where parts : Set (Set V) isPartition : Setoid.IsPartition parts independent : ∀ s ∈ parts, IsAntichain G.Adj s #align simple_graph.partition SimpleGraph.Partition def Partition.PartsCardLe {G : SimpleGraph V} (P : G.Partition) (n : ℕ) : Prop := ∃ h : P.parts.Finite, h.toFinset.card ≤ n #align simple_graph.partition.parts_card_le SimpleGraph.Partition.PartsCardLe def Partitionable (n : ℕ) : Prop := ∃ P : G.Partition, P.PartsCardLe n #align simple_graph.partitionable SimpleGraph.Partitionable namespace Partition variable {G} (P : G.Partition) def partOfVertex (v : V) : Set V := Classical.choose (P.isPartition.2 v) #align simple_graph.partition.part_of_vertex SimpleGraph.Partition.partOfVertex theorem partOfVertex_mem (v : V) : P.partOfVertex v ∈ P.parts := by obtain ⟨h, -⟩ := (P.isPartition.2 v).choose_spec.1 exact h #align simple_graph.partition.part_of_vertex_mem SimpleGraph.Partition.partOfVertex_mem theorem mem_partOfVertex (v : V) : v ∈ P.partOfVertex v := by obtain ⟨⟨_, h⟩, _⟩ := (P.isPartition.2 v).choose_spec exact h #align simple_graph.partition.mem_part_of_vertex SimpleGraph.Partition.mem_partOfVertex	Mathlib/Combinatorics/SimpleGraph/Partition.lean	98	102	theorem partOfVertex_ne_of_adj {v w : V} (h : G.Adj v w) : P.partOfVertex v ≠ P.partOfVertex w := by	intro hn have hw := P.mem_partOfVertex w rw [← hn] at hw exact P.independent _ (P.partOfVertex_mem v) (P.mem_partOfVertex v) hw (G.ne_of_adj h) h
import Mathlib.Algebra.MonoidAlgebra.Support import Mathlib.Algebra.Polynomial.Basic import Mathlib.Algebra.Regular.Basic import Mathlib.Data.Nat.Choose.Sum #align_import data.polynomial.coeff from "leanprover-community/mathlib"@"2651125b48fc5c170ab1111afd0817c903b1fc6c" set_option linter.uppercaseLean3 false noncomputable section open Finsupp Finset AddMonoidAlgebra open Polynomial namespace Polynomial universe u v variable {R : Type u} {S : Type v} {a b : R} {n m : ℕ} variable [Semiring R] {p q r : R[X]} section Coeff @[simp] theorem coeff_add (p q : R[X]) (n : ℕ) : coeff (p + q) n = coeff p n + coeff q n := by rcases p with ⟨⟩ rcases q with ⟨⟩ simp_rw [← ofFinsupp_add, coeff] exact Finsupp.add_apply _ _ _ #align polynomial.coeff_add Polynomial.coeff_add set_option linter.deprecated false in @[simp] theorem coeff_bit0 (p : R[X]) (n : ℕ) : coeff (bit0 p) n = bit0 (coeff p n) := by simp [bit0] #align polynomial.coeff_bit0 Polynomial.coeff_bit0 @[simp] theorem coeff_smul [SMulZeroClass S R] (r : S) (p : R[X]) (n : ℕ) : coeff (r • p) n = r • coeff p n := by rcases p with ⟨⟩ simp_rw [← ofFinsupp_smul, coeff] exact Finsupp.smul_apply _ _ _ #align polynomial.coeff_smul Polynomial.coeff_smul theorem support_smul [SMulZeroClass S R] (r : S) (p : R[X]) : support (r • p) ⊆ support p := by intro i hi simp? [mem_support_iff] at hi ⊢ says simp only [mem_support_iff, coeff_smul, ne_eq] at hi ⊢ contrapose! hi simp [hi] #align polynomial.support_smul Polynomial.support_smul open scoped Pointwise in theorem card_support_mul_le : (p * q).support.card ≤ p.support.card * q.support.card := by calc (p * q).support.card _ = (p.toFinsupp * q.toFinsupp).support.card := by rw [← support_toFinsupp, toFinsupp_mul] _ ≤ (p.toFinsupp.support + q.toFinsupp.support).card := Finset.card_le_card (AddMonoidAlgebra.support_mul p.toFinsupp q.toFinsupp) _ ≤ p.support.card * q.support.card := Finset.card_image₂_le .. @[simps] def lsum {R A M : Type} [Semiring R] [Semiring A] [AddCommMonoid M] [Module R A] [Module R M] (f : ℕ → A →ₗ[R] M) : A[X] →ₗ[R] M where toFun p := p.sum (f · ·) map_add' p q := sum_add_index p q _ (fun n => (f n).map_zero) fun n _ _ => (f n).map_add _ _ map_smul' c p := by -- Porting note: added `dsimp only`; `beta_reduce` alone is not sufficient dsimp only rw [sum_eq_of_subset (f · ·) (fun n => (f n).map_zero) (support_smul c p)] simp only [sum_def, Finset.smul_sum, coeff_smul, LinearMap.map_smul, RingHom.id_apply] #align polynomial.lsum Polynomial.lsum #align polynomial.lsum_apply Polynomial.lsum_apply variable (R) def lcoeff (n : ℕ) : R[X] →ₗ[R] R where toFun p := coeff p n map_add' p q := coeff_add p q n map_smul' r p := coeff_smul r p n #align polynomial.lcoeff Polynomial.lcoeff variable {R} @[simp] theorem lcoeff_apply (n : ℕ) (f : R[X]) : lcoeff R n f = coeff f n := rfl #align polynomial.lcoeff_apply Polynomial.lcoeff_apply @[simp] theorem finset_sum_coeff {ι : Type} (s : Finset ι) (f : ι → R[X]) (n : ℕ) : coeff (∑ b ∈ s, f b) n = ∑ b ∈ s, coeff (f b) n := map_sum (lcoeff R n) _ _ #align polynomial.finset_sum_coeff Polynomial.finset_sum_coeff lemma coeff_list_sum (l : List R[X]) (n : ℕ) : l.sum.coeff n = (l.map (lcoeff R n)).sum := map_list_sum (lcoeff R n) _ lemma coeff_list_sum_map {ι : Type} (l : List ι) (f : ι → R[X]) (n : ℕ) : (l.map f).sum.coeff n = (l.map (fun a => (f a).coeff n)).sum := by simp_rw [coeff_list_sum, List.map_map, Function.comp, lcoeff_apply] theorem coeff_sum [Semiring S] (n : ℕ) (f : ℕ → R → S[X]) : coeff (p.sum f) n = p.sum fun a b => coeff (f a b) n := by rcases p with ⟨⟩ -- porting note (#10745): was `simp [Polynomial.sum, support, coeff]`. simp [Polynomial.sum, support_ofFinsupp, coeff_ofFinsupp] #align polynomial.coeff_sum Polynomial.coeff_sum theorem coeff_mul (p q : R[X]) (n : ℕ) : coeff (p q) n = ∑ x ∈ antidiagonal n, coeff p x.1 * coeff q x.2 := by rcases p with ⟨p⟩; rcases q with ⟨q⟩ simp_rw [← ofFinsupp_mul, coeff] exact AddMonoidAlgebra.mul_apply_antidiagonal p q n _ Finset.mem_antidiagonal #align polynomial.coeff_mul Polynomial.coeff_mul @[simp] theorem mul_coeff_zero (p q : R[X]) : coeff (p * q) 0 = coeff p 0 * coeff q 0 := by simp [coeff_mul] #align polynomial.mul_coeff_zero Polynomial.mul_coeff_zero @[simps] def constantCoeff : R[X] →+* R where toFun p := coeff p 0 map_one' := coeff_one_zero map_mul' := mul_coeff_zero map_zero' := coeff_zero 0 map_add' p q := coeff_add p q 0 #align polynomial.constant_coeff Polynomial.constantCoeff #align polynomial.constant_coeff_apply Polynomial.constantCoeff_apply theorem isUnit_C {x : R} : IsUnit (C x) ↔ IsUnit x := ⟨fun h => (congr_arg IsUnit coeff_C_zero).mp (h.map <\| @constantCoeff R _), fun h => h.map C⟩ #align polynomial.is_unit_C Polynomial.isUnit_C theorem coeff_mul_X_zero (p : R[X]) : coeff (p * X) 0 = 0 := by simp #align polynomial.coeff_mul_X_zero Polynomial.coeff_mul_X_zero theorem coeff_X_mul_zero (p : R[X]) : coeff (X * p) 0 = 0 := by simp #align polynomial.coeff_X_mul_zero Polynomial.coeff_X_mul_zero theorem coeff_C_mul_X_pow (x : R) (k n : ℕ) : coeff (C x * X ^ k : R[X]) n = if n = k then x else 0 := by rw [C_mul_X_pow_eq_monomial, coeff_monomial] congr 1 simp [eq_comm] #align polynomial.coeff_C_mul_X_pow Polynomial.coeff_C_mul_X_pow theorem coeff_C_mul_X (x : R) (n : ℕ) : coeff (C x * X : R[X]) n = if n = 1 then x else 0 := by rw [← pow_one X, coeff_C_mul_X_pow] #align polynomial.coeff_C_mul_X Polynomial.coeff_C_mul_X @[simp] theorem coeff_C_mul (p : R[X]) : coeff (C a * p) n = a * coeff p n := by rcases p with ⟨p⟩ simp_rw [← monomial_zero_left, ← ofFinsupp_single, ← ofFinsupp_mul, coeff] exact AddMonoidAlgebra.single_zero_mul_apply p a n #align polynomial.coeff_C_mul Polynomial.coeff_C_mul theorem C_mul' (a : R) (f : R[X]) : C a * f = a • f := by ext rw [coeff_C_mul, coeff_smul, smul_eq_mul] #align polynomial.C_mul' Polynomial.C_mul' @[simp] theorem coeff_mul_C (p : R[X]) (n : ℕ) (a : R) : coeff (p * C a) n = coeff p n * a := by rcases p with ⟨p⟩ simp_rw [← monomial_zero_left, ← ofFinsupp_single, ← ofFinsupp_mul, coeff] exact AddMonoidAlgebra.mul_single_zero_apply p a n #align polynomial.coeff_mul_C Polynomial.coeff_mul_C @[simp] lemma coeff_mul_natCast {a k : ℕ} : coeff (p * (a : R[X])) k = coeff p k * (↑a : R) := coeff_mul_C _ _ _ @[simp] lemma coeff_natCast_mul {a k : ℕ} : coeff ((a : R[X]) * p) k = a * coeff p k := coeff_C_mul _ -- See note [no_index around OfNat.ofNat] @[simp] lemma coeff_mul_ofNat {a k : ℕ} [Nat.AtLeastTwo a] : coeff (p * (no_index (OfNat.ofNat a) : R[X])) k = coeff p k * OfNat.ofNat a := coeff_mul_C _ _ _ -- See note [no_index around OfNat.ofNat] @[simp] lemma coeff_ofNat_mul {a k : ℕ} [Nat.AtLeastTwo a] : coeff ((no_index (OfNat.ofNat a) : R[X]) * p) k = OfNat.ofNat a * coeff p k := coeff_C_mul _ @[simp] lemma coeff_mul_intCast [Ring S] {p : S[X]} {a : ℤ} {k : ℕ} : coeff (p * (a : S[X])) k = coeff p k * (↑a : S) := coeff_mul_C _ _ _ @[simp] lemma coeff_intCast_mul [Ring S] {p : S[X]} {a : ℤ} {k : ℕ} : coeff ((a : S[X]) * p) k = a * coeff p k := coeff_C_mul _ @[simp] theorem coeff_X_pow (k n : ℕ) : coeff (X ^ k : R[X]) n = if n = k then 1 else 0 := by simp only [one_mul, RingHom.map_one, ← coeff_C_mul_X_pow] #align polynomial.coeff_X_pow Polynomial.coeff_X_pow theorem coeff_X_pow_self (n : ℕ) : coeff (X ^ n : R[X]) n = 1 := by simp #align polynomial.coeff_X_pow_self Polynomial.coeff_X_pow_self @[simp] theorem coeff_mul_X_pow (p : R[X]) (n d : ℕ) : coeff (p * Polynomial.X ^ n) (d + n) = coeff p d := by rw [coeff_mul, Finset.sum_eq_single (d, n), coeff_X_pow, if_pos rfl, mul_one] · rintro ⟨i, j⟩ h1 h2 rw [coeff_X_pow, if_neg, mul_zero] rintro rfl apply h2 rw [mem_antidiagonal, add_right_cancel_iff] at h1 subst h1 rfl · exact fun h1 => (h1 (mem_antidiagonal.2 rfl)).elim #align polynomial.coeff_mul_X_pow Polynomial.coeff_mul_X_pow @[simp] theorem coeff_X_pow_mul (p : R[X]) (n d : ℕ) : coeff (Polynomial.X ^ n * p) (d + n) = coeff p d := by rw [(commute_X_pow p n).eq, coeff_mul_X_pow] #align polynomial.coeff_X_pow_mul Polynomial.coeff_X_pow_mul theorem coeff_mul_X_pow' (p : R[X]) (n d : ℕ) : (p * X ^ n).coeff d = ite (n ≤ d) (p.coeff (d - n)) 0 := by split_ifs with h · rw [← tsub_add_cancel_of_le h, coeff_mul_X_pow, add_tsub_cancel_right] · refine (coeff_mul _ _ _).trans (Finset.sum_eq_zero fun x hx => ?_) rw [coeff_X_pow, if_neg, mul_zero] exact ((le_of_add_le_right (mem_antidiagonal.mp hx).le).trans_lt <\| not_le.mp h).ne #align polynomial.coeff_mul_X_pow' Polynomial.coeff_mul_X_pow' theorem coeff_X_pow_mul' (p : R[X]) (n d : ℕ) : (X ^ n * p).coeff d = ite (n ≤ d) (p.coeff (d - n)) 0 := by rw [(commute_X_pow p n).eq, coeff_mul_X_pow'] #align polynomial.coeff_X_pow_mul' Polynomial.coeff_X_pow_mul' @[simp] theorem coeff_mul_X (p : R[X]) (n : ℕ) : coeff (p * X) (n + 1) = coeff p n := by simpa only [pow_one] using coeff_mul_X_pow p 1 n #align polynomial.coeff_mul_X Polynomial.coeff_mul_X @[simp] theorem coeff_X_mul (p : R[X]) (n : ℕ) : coeff (X * p) (n + 1) = coeff p n := by rw [(commute_X p).eq, coeff_mul_X] #align polynomial.coeff_X_mul Polynomial.coeff_X_mul theorem coeff_mul_monomial (p : R[X]) (n d : ℕ) (r : R) : coeff (p * monomial n r) (d + n) = coeff p d * r := by rw [← C_mul_X_pow_eq_monomial, ← X_pow_mul, ← mul_assoc, coeff_mul_C, coeff_mul_X_pow] #align polynomial.coeff_mul_monomial Polynomial.coeff_mul_monomial theorem coeff_monomial_mul (p : R[X]) (n d : ℕ) (r : R) : coeff (monomial n r * p) (d + n) = r * coeff p d := by rw [← C_mul_X_pow_eq_monomial, mul_assoc, coeff_C_mul, X_pow_mul, coeff_mul_X_pow] #align polynomial.coeff_monomial_mul Polynomial.coeff_monomial_mul -- This can already be proved by `simp`. theorem coeff_mul_monomial_zero (p : R[X]) (d : ℕ) (r : R) : coeff (p * monomial 0 r) d = coeff p d * r := coeff_mul_monomial p 0 d r #align polynomial.coeff_mul_monomial_zero Polynomial.coeff_mul_monomial_zero -- This can already be proved by `simp`. theorem coeff_monomial_zero_mul (p : R[X]) (d : ℕ) (r : R) : coeff (monomial 0 r * p) d = r * coeff p d := coeff_monomial_mul p 0 d r #align polynomial.coeff_monomial_zero_mul Polynomial.coeff_monomial_zero_mul theorem mul_X_pow_eq_zero {p : R[X]} {n : ℕ} (H : p * X ^ n = 0) : p = 0 := ext fun k => (coeff_mul_X_pow p n k).symm.trans <\| ext_iff.1 H (k + n) #align polynomial.mul_X_pow_eq_zero Polynomial.mul_X_pow_eq_zero	Mathlib/Algebra/Polynomial/Coeff.lean	328	333	theorem isRegular_X_pow (n : ℕ) : IsRegular (X ^ n : R[X]) := by	suffices IsLeftRegular (X^n : R[X]) from ⟨this, this.right_of_commute (fun p => commute_X_pow p n)⟩ intro P Q (hPQ : X^n * P = X^n * Q) ext i rw [← coeff_X_pow_mul P n i, hPQ, coeff_X_pow_mul Q n i]
import Mathlib.Analysis.Calculus.Deriv.Add #align_import analysis.calculus.local_extr from "leanprover-community/mathlib"@"3bce8d800a6f2b8f63fe1e588fd76a9ff4adcebe" universe u v open Filter Set open scoped Topology Classical section Module variable {E : Type u} [NormedAddCommGroup E] [NormedSpace ℝ E] {f : E → ℝ} {a : E} {f' : E →L[ℝ] ℝ} def posTangentConeAt (s : Set E) (x : E) : Set E := { y : E \| ∃ (c : ℕ → ℝ) (d : ℕ → E), (∀ᶠ n in atTop, x + d n ∈ s) ∧ Tendsto c atTop atTop ∧ Tendsto (fun n => c n • d n) atTop (𝓝 y) } #align pos_tangent_cone_at posTangentConeAt	Mathlib/Analysis/Calculus/LocalExtr/Basic.lean	81	83	theorem posTangentConeAt_mono : Monotone fun s => posTangentConeAt s a := by	rintro s t hst y ⟨c, d, hd, hc, hcd⟩ exact ⟨c, d, mem_of_superset hd fun h hn => hst hn, hc, hcd⟩
import Mathlib.Algebra.Order.Group.Defs import Mathlib.Algebra.Order.Monoid.WithTop #align_import algebra.order.group.with_top from "leanprover-community/mathlib"@"f178c0e25af359f6cbc72a96a243efd3b12423a3" namespace WithTop variable {α : Type*} namespace LinearOrderedAddCommGroup variable [LinearOrderedAddCommGroup α] {a b c d : α} instance instNeg : Neg (WithTop α) where neg := Option.map fun a : α => -a protected def sub : ∀ _ _ : WithTop α, WithTop α \| _, ⊤ => ⊤ \| ⊤, (x : α) => ⊤ \| (x : α), (y : α) => (x - y : α) instance instSub : Sub (WithTop α) where sub := WithTop.LinearOrderedAddCommGroup.sub @[simp, norm_cast] theorem coe_neg (a : α) : ((-a : α) : WithTop α) = -a := rfl #align with_top.coe_neg WithTop.LinearOrderedAddCommGroup.coe_neg @[simp] theorem neg_top : -(⊤ : WithTop α) = ⊤ := rfl @[simp, norm_cast] theorem coe_sub {a b : α} : (↑(a - b) : WithTop α) = ↑a - ↑b := rfl @[simp]	Mathlib/Algebra/Order/Group/WithTop.lean	61	62	theorem top_sub {a : WithTop α} : (⊤ : WithTop α) - a = ⊤ := by	cases a <;> rfl
import Mathlib.Probability.ConditionalProbability import Mathlib.MeasureTheory.Measure.Count #align_import probability.cond_count from "leanprover-community/mathlib"@"117e93f82b5f959f8193857370109935291f0cc4" noncomputable section open ProbabilityTheory open MeasureTheory MeasurableSpace namespace ProbabilityTheory variable {Ω : Type*} [MeasurableSpace Ω] def condCount (s : Set Ω) : Measure Ω := Measure.count[\|s] #align probability_theory.cond_count ProbabilityTheory.condCount @[simp] theorem condCount_empty_meas : (condCount ∅ : Measure Ω) = 0 := by simp [condCount] #align probability_theory.cond_count_empty_meas ProbabilityTheory.condCount_empty_meas theorem condCount_empty {s : Set Ω} : condCount s ∅ = 0 := by simp #align probability_theory.cond_count_empty ProbabilityTheory.condCount_empty theorem finite_of_condCount_ne_zero {s t : Set Ω} (h : condCount s t ≠ 0) : s.Finite := by by_contra hs' simp [condCount, cond, Measure.count_apply_infinite hs'] at h #align probability_theory.finite_of_cond_count_ne_zero ProbabilityTheory.finite_of_condCount_ne_zero theorem condCount_univ [Fintype Ω] {s : Set Ω} : condCount Set.univ s = Measure.count s / Fintype.card Ω := by rw [condCount, cond_apply _ MeasurableSet.univ, ← ENNReal.div_eq_inv_mul, Set.univ_inter] congr rw [← Finset.coe_univ, Measure.count_apply, Finset.univ.tsum_subtype' fun _ => (1 : ENNReal)] · simp [Finset.card_univ] · exact (@Finset.coe_univ Ω _).symm ▸ MeasurableSet.univ #align probability_theory.cond_count_univ ProbabilityTheory.condCount_univ variable [MeasurableSingletonClass Ω] theorem condCount_isProbabilityMeasure {s : Set Ω} (hs : s.Finite) (hs' : s.Nonempty) : IsProbabilityMeasure (condCount s) := { measure_univ := by rw [condCount, cond_apply _ hs.measurableSet, Set.inter_univ, ENNReal.inv_mul_cancel] · exact fun h => hs'.ne_empty <\| Measure.empty_of_count_eq_zero h · exact (Measure.count_apply_lt_top.2 hs).ne } #align probability_theory.cond_count_is_probability_measure ProbabilityTheory.condCount_isProbabilityMeasure theorem condCount_singleton (ω : Ω) (t : Set Ω) [Decidable (ω ∈ t)] : condCount {ω} t = if ω ∈ t then 1 else 0 := by rw [condCount, cond_apply _ (measurableSet_singleton ω), Measure.count_singleton, inv_one, one_mul] split_ifs · rw [(by simpa : ({ω} : Set Ω) ∩ t = {ω}), Measure.count_singleton] · rw [(by simpa : ({ω} : Set Ω) ∩ t = ∅), Measure.count_empty] #align probability_theory.cond_count_singleton ProbabilityTheory.condCount_singleton variable {s t u : Set Ω} theorem condCount_inter_self (hs : s.Finite) : condCount s (s ∩ t) = condCount s t := by rw [condCount, cond_inter_self _ hs.measurableSet] #align probability_theory.cond_count_inter_self ProbabilityTheory.condCount_inter_self theorem condCount_self (hs : s.Finite) (hs' : s.Nonempty) : condCount s s = 1 := by rw [condCount, cond_apply _ hs.measurableSet, Set.inter_self, ENNReal.inv_mul_cancel] · exact fun h => hs'.ne_empty <\| Measure.empty_of_count_eq_zero h · exact (Measure.count_apply_lt_top.2 hs).ne #align probability_theory.cond_count_self ProbabilityTheory.condCount_self	Mathlib/Probability/CondCount.lean	110	115	theorem condCount_eq_one_of (hs : s.Finite) (hs' : s.Nonempty) (ht : s ⊆ t) : condCount s t = 1 := by	haveI := condCount_isProbabilityMeasure hs hs' refine eq_of_le_of_not_lt prob_le_one ?_ rw [not_lt, ← condCount_self hs hs'] exact measure_mono ht
import Mathlib.Data.Bracket import Mathlib.LinearAlgebra.Basic #align_import algebra.lie.basic from "leanprover-community/mathlib"@"dc6c365e751e34d100e80fe6e314c3c3e0fd2988" universe u v w w₁ w₂ open Function class LieRing (L : Type v) extends AddCommGroup L, Bracket L L where protected add_lie : ∀ x y z : L, ⁅x + y, z⁆ = ⁅x, z⁆ + ⁅y, z⁆ protected lie_add : ∀ x y z : L, ⁅x, y + z⁆ = ⁅x, y⁆ + ⁅x, z⁆ protected lie_self : ∀ x : L, ⁅x, x⁆ = 0 protected leibniz_lie : ∀ x y z : L, ⁅x, ⁅y, z⁆⁆ = ⁅⁅x, y⁆, z⁆ + ⁅y, ⁅x, z⁆⁆ #align lie_ring LieRing class LieAlgebra (R : Type u) (L : Type v) [CommRing R] [LieRing L] extends Module R L where protected lie_smul : ∀ (t : R) (x y : L), ⁅x, t • y⁆ = t • ⁅x, y⁆ #align lie_algebra LieAlgebra class LieRingModule (L : Type v) (M : Type w) [LieRing L] [AddCommGroup M] extends Bracket L M where protected add_lie : ∀ (x y : L) (m : M), ⁅x + y, m⁆ = ⁅x, m⁆ + ⁅y, m⁆ protected lie_add : ∀ (x : L) (m n : M), ⁅x, m + n⁆ = ⁅x, m⁆ + ⁅x, n⁆ protected leibniz_lie : ∀ (x y : L) (m : M), ⁅x, ⁅y, m⁆⁆ = ⁅⁅x, y⁆, m⁆ + ⁅y, ⁅x, m⁆⁆ #align lie_ring_module LieRingModule class LieModule (R : Type u) (L : Type v) (M : Type w) [CommRing R] [LieRing L] [LieAlgebra R L] [AddCommGroup M] [Module R M] [LieRingModule L M] : Prop where protected smul_lie : ∀ (t : R) (x : L) (m : M), ⁅t • x, m⁆ = t • ⁅x, m⁆ protected lie_smul : ∀ (t : R) (x : L) (m : M), ⁅x, t • m⁆ = t • ⁅x, m⁆ #align lie_module LieModule section BasicProperties variable {R : Type u} {L : Type v} {M : Type w} {N : Type w₁} variable [CommRing R] [LieRing L] [LieAlgebra R L] variable [AddCommGroup M] [Module R M] [LieRingModule L M] [LieModule R L M] variable [AddCommGroup N] [Module R N] [LieRingModule L N] [LieModule R L N] variable (t : R) (x y z : L) (m n : M) @[simp] theorem add_lie : ⁅x + y, m⁆ = ⁅x, m⁆ + ⁅y, m⁆ := LieRingModule.add_lie x y m #align add_lie add_lie @[simp] theorem lie_add : ⁅x, m + n⁆ = ⁅x, m⁆ + ⁅x, n⁆ := LieRingModule.lie_add x m n #align lie_add lie_add @[simp] theorem smul_lie : ⁅t • x, m⁆ = t • ⁅x, m⁆ := LieModule.smul_lie t x m #align smul_lie smul_lie @[simp] theorem lie_smul : ⁅x, t • m⁆ = t • ⁅x, m⁆ := LieModule.lie_smul t x m #align lie_smul lie_smul theorem leibniz_lie : ⁅x, ⁅y, m⁆⁆ = ⁅⁅x, y⁆, m⁆ + ⁅y, ⁅x, m⁆⁆ := LieRingModule.leibniz_lie x y m #align leibniz_lie leibniz_lie @[simp] theorem lie_zero : ⁅x, 0⁆ = (0 : M) := (AddMonoidHom.mk' _ (lie_add x)).map_zero #align lie_zero lie_zero @[simp] theorem zero_lie : ⁅(0 : L), m⁆ = 0 := (AddMonoidHom.mk' (fun x : L => ⁅x, m⁆) fun x y => add_lie x y m).map_zero #align zero_lie zero_lie @[simp] theorem lie_self : ⁅x, x⁆ = 0 := LieRing.lie_self x #align lie_self lie_self instance lieRingSelfModule : LieRingModule L L := { (inferInstance : LieRing L) with } #align lie_ring_self_module lieRingSelfModule @[simp] theorem lie_skew : -⁅y, x⁆ = ⁅x, y⁆ := by have h : ⁅x + y, x⁆ + ⁅x + y, y⁆ = 0 := by rw [← lie_add]; apply lie_self simpa [neg_eq_iff_add_eq_zero] using h #align lie_skew lie_skew instance lieAlgebraSelfModule : LieModule R L L where smul_lie t x m := by rw [← lie_skew, ← lie_skew x m, LieAlgebra.lie_smul, smul_neg] lie_smul := by apply LieAlgebra.lie_smul #align lie_algebra_self_module lieAlgebraSelfModule @[simp] theorem neg_lie : ⁅-x, m⁆ = -⁅x, m⁆ := by rw [← sub_eq_zero, sub_neg_eq_add, ← add_lie] simp #align neg_lie neg_lie @[simp] theorem lie_neg : ⁅x, -m⁆ = -⁅x, m⁆ := by rw [← sub_eq_zero, sub_neg_eq_add, ← lie_add] simp #align lie_neg lie_neg @[simp] theorem sub_lie : ⁅x - y, m⁆ = ⁅x, m⁆ - ⁅y, m⁆ := by simp [sub_eq_add_neg] #align sub_lie sub_lie @[simp] theorem lie_sub : ⁅x, m - n⁆ = ⁅x, m⁆ - ⁅x, n⁆ := by simp [sub_eq_add_neg] #align lie_sub lie_sub @[simp] theorem nsmul_lie (n : ℕ) : ⁅n • x, m⁆ = n • ⁅x, m⁆ := AddMonoidHom.map_nsmul { toFun := fun x : L => ⁅x, m⁆, map_zero' := zero_lie m, map_add' := fun _ _ => add_lie _ _ _ } _ _ #align nsmul_lie nsmul_lie @[simp] theorem lie_nsmul (n : ℕ) : ⁅x, n • m⁆ = n • ⁅x, m⁆ := AddMonoidHom.map_nsmul { toFun := fun m : M => ⁅x, m⁆, map_zero' := lie_zero x, map_add' := fun _ _ => lie_add _ _ _} _ _ #align lie_nsmul lie_nsmul @[simp] theorem zsmul_lie (a : ℤ) : ⁅a • x, m⁆ = a • ⁅x, m⁆ := AddMonoidHom.map_zsmul { toFun := fun x : L => ⁅x, m⁆, map_zero' := zero_lie m, map_add' := fun _ _ => add_lie _ _ _ } _ _ #align zsmul_lie zsmul_lie @[simp] theorem lie_zsmul (a : ℤ) : ⁅x, a • m⁆ = a • ⁅x, m⁆ := AddMonoidHom.map_zsmul { toFun := fun m : M => ⁅x, m⁆, map_zero' := lie_zero x, map_add' := fun _ _ => lie_add _ _ _ } _ _ #align lie_zsmul lie_zsmul @[simp] lemma lie_lie : ⁅⁅x, y⁆, m⁆ = ⁅x, ⁅y, m⁆⁆ - ⁅y, ⁅x, m⁆⁆ := by rw [leibniz_lie, add_sub_cancel_right] #align lie_lie lie_lie	Mathlib/Algebra/Lie/Basic.lean	214	216	theorem lie_jacobi : ⁅x, ⁅y, z⁆⁆ + ⁅y, ⁅z, x⁆⁆ + ⁅z, ⁅x, y⁆⁆ = 0 := by	rw [← neg_neg ⁅x, y⁆, lie_neg z, lie_skew y x, ← lie_skew, lie_lie] abel
import Mathlib.Analysis.InnerProductSpace.Dual import Mathlib.Analysis.InnerProductSpace.Orientation import Mathlib.Data.Complex.Orientation import Mathlib.Tactic.LinearCombination #align_import analysis.inner_product_space.two_dim from "leanprover-community/mathlib"@"cd8fafa2fac98e1a67097e8a91ad9901cfde48af" noncomputable section open scoped RealInnerProductSpace ComplexConjugate open FiniteDimensional lemma FiniteDimensional.of_fact_finrank_eq_two {K V : Type} [DivisionRing K] [AddCommGroup V] [Module K V] [Fact (finrank K V = 2)] : FiniteDimensional K V := .of_fact_finrank_eq_succ 1 attribute [local instance] FiniteDimensional.of_fact_finrank_eq_two @[deprecated (since := "2024-02-02")] alias FiniteDimensional.finiteDimensional_of_fact_finrank_eq_two := FiniteDimensional.of_fact_finrank_eq_two variable {E : Type} [NormedAddCommGroup E] [InnerProductSpace ℝ E] [Fact (finrank ℝ E = 2)] (o : Orientation ℝ E (Fin 2)) namespace Orientation irreducible_def areaForm : E →ₗ[ℝ] E →ₗ[ℝ] ℝ := by let z : E [⋀^Fin 0]→ₗ[ℝ] ℝ ≃ₗ[ℝ] ℝ := AlternatingMap.constLinearEquivOfIsEmpty.symm let y : E [⋀^Fin 1]→ₗ[ℝ] ℝ →ₗ[ℝ] E →ₗ[ℝ] ℝ := LinearMap.llcomp ℝ E (E [⋀^Fin 0]→ₗ[ℝ] ℝ) ℝ z ∘ₗ AlternatingMap.curryLeftLinearMap exact y ∘ₗ AlternatingMap.curryLeftLinearMap (R' := ℝ) o.volumeForm #align orientation.area_form Orientation.areaForm local notation "ω" => o.areaForm theorem areaForm_to_volumeForm (x y : E) : ω x y = o.volumeForm ![x, y] := by simp [areaForm] #align orientation.area_form_to_volume_form Orientation.areaForm_to_volumeForm @[simp] theorem areaForm_apply_self (x : E) : ω x x = 0 := by rw [areaForm_to_volumeForm] refine o.volumeForm.map_eq_zero_of_eq ![x, x] ?_ (?_ : (0 : Fin 2) ≠ 1) · simp · norm_num #align orientation.area_form_apply_self Orientation.areaForm_apply_self theorem areaForm_swap (x y : E) : ω x y = -ω y x := by simp only [areaForm_to_volumeForm] convert o.volumeForm.map_swap ![y, x] (_ : (0 : Fin 2) ≠ 1) · ext i fin_cases i <;> rfl · norm_num #align orientation.area_form_swap Orientation.areaForm_swap @[simp] theorem areaForm_neg_orientation : (-o).areaForm = -o.areaForm := by ext x y simp [areaForm_to_volumeForm] #align orientation.area_form_neg_orientation Orientation.areaForm_neg_orientation def areaForm' : E →L[ℝ] E →L[ℝ] ℝ := LinearMap.toContinuousLinearMap (↑(LinearMap.toContinuousLinearMap : (E →ₗ[ℝ] ℝ) ≃ₗ[ℝ] E →L[ℝ] ℝ) ∘ₗ o.areaForm) #align orientation.area_form' Orientation.areaForm' @[simp] theorem areaForm'_apply (x : E) : o.areaForm' x = LinearMap.toContinuousLinearMap (o.areaForm x) := rfl #align orientation.area_form'_apply Orientation.areaForm'_apply theorem abs_areaForm_le (x y : E) : \|ω x y\| ≤ ‖x‖ * ‖y‖ := by simpa [areaForm_to_volumeForm, Fin.prod_univ_succ] using o.abs_volumeForm_apply_le ![x, y] #align orientation.abs_area_form_le Orientation.abs_areaForm_le theorem areaForm_le (x y : E) : ω x y ≤ ‖x‖ * ‖y‖ := by simpa [areaForm_to_volumeForm, Fin.prod_univ_succ] using o.volumeForm_apply_le ![x, y] #align orientation.area_form_le Orientation.areaForm_le theorem abs_areaForm_of_orthogonal {x y : E} (h : ⟪x, y⟫ = 0) : \|ω x y\| = ‖x‖ * ‖y‖ := by rw [o.areaForm_to_volumeForm, o.abs_volumeForm_apply_of_pairwise_orthogonal] · simp [Fin.prod_univ_succ] intro i j hij fin_cases i <;> fin_cases j · simp_all · simpa using h · simpa [real_inner_comm] using h · simp_all #align orientation.abs_area_form_of_orthogonal Orientation.abs_areaForm_of_orthogonal theorem areaForm_map {F : Type*} [NormedAddCommGroup F] [InnerProductSpace ℝ F] [hF : Fact (finrank ℝ F = 2)] (φ : E ≃ₗᵢ[ℝ] F) (x y : F) : (Orientation.map (Fin 2) φ.toLinearEquiv o).areaForm x y = o.areaForm (φ.symm x) (φ.symm y) := by have : φ.symm ∘ ![x, y] = ![φ.symm x, φ.symm y] := by ext i fin_cases i <;> rfl simp [areaForm_to_volumeForm, volumeForm_map, this] #align orientation.area_form_map Orientation.areaForm_map theorem areaForm_comp_linearIsometryEquiv (φ : E ≃ₗᵢ[ℝ] E) (hφ : 0 < LinearMap.det (φ.toLinearEquiv : E →ₗ[ℝ] E)) (x y : E) : o.areaForm (φ x) (φ y) = o.areaForm x y := by convert o.areaForm_map φ (φ x) (φ y) · symm rwa [← o.map_eq_iff_det_pos φ.toLinearEquiv] at hφ rw [@Fact.out (finrank ℝ E = 2), Fintype.card_fin] · simp · simp #align orientation.area_form_comp_linear_isometry_equiv Orientation.areaForm_comp_linearIsometryEquiv irreducible_def rightAngleRotationAux₁ : E →ₗ[ℝ] E := let to_dual : E ≃ₗ[ℝ] E →ₗ[ℝ] ℝ := (InnerProductSpace.toDual ℝ E).toLinearEquiv ≪≫ₗ LinearMap.toContinuousLinearMap.symm ↑to_dual.symm ∘ₗ ω #align orientation.right_angle_rotation_aux₁ Orientation.rightAngleRotationAux₁ @[simp] theorem inner_rightAngleRotationAux₁_left (x y : E) : ⟪o.rightAngleRotationAux₁ x, y⟫ = ω x y := by -- Porting note: split `simp only` for greater proof control simp only [rightAngleRotationAux₁, LinearEquiv.trans_symm, LinearIsometryEquiv.toLinearEquiv_symm, LinearMap.coe_comp, LinearEquiv.coe_coe, Function.comp_apply, LinearEquiv.trans_apply, LinearIsometryEquiv.coe_toLinearEquiv] rw [InnerProductSpace.toDual_symm_apply] norm_cast #align orientation.inner_right_angle_rotation_aux₁_left Orientation.inner_rightAngleRotationAux₁_left @[simp] theorem inner_rightAngleRotationAux₁_right (x y : E) : ⟪x, o.rightAngleRotationAux₁ y⟫ = -ω x y := by rw [real_inner_comm] simp [o.areaForm_swap y x] #align orientation.inner_right_angle_rotation_aux₁_right Orientation.inner_rightAngleRotationAux₁_right def rightAngleRotationAux₂ : E →ₗᵢ[ℝ] E := { o.rightAngleRotationAux₁ with norm_map' := fun x => by dsimp refine le_antisymm ?_ ?_ · cases' eq_or_lt_of_le (norm_nonneg (o.rightAngleRotationAux₁ x)) with h h · rw [← h] positivity refine le_of_mul_le_mul_right ?_ h rw [← real_inner_self_eq_norm_mul_norm, o.inner_rightAngleRotationAux₁_left] exact o.areaForm_le x (o.rightAngleRotationAux₁ x) · let K : Submodule ℝ E := ℝ ∙ x have : Nontrivial Kᗮ := by apply @FiniteDimensional.nontrivial_of_finrank_pos ℝ have : finrank ℝ K ≤ Finset.card {x} := by rw [← Set.toFinset_singleton] exact finrank_span_le_card ({x} : Set E) have : Finset.card {x} = 1 := Finset.card_singleton x have : finrank ℝ K + finrank ℝ Kᗮ = finrank ℝ E := K.finrank_add_finrank_orthogonal have : finrank ℝ E = 2 := Fact.out linarith obtain ⟨w, hw₀⟩ : ∃ w : Kᗮ, w ≠ 0 := exists_ne 0 have hw' : ⟪x, (w : E)⟫ = 0 := Submodule.mem_orthogonal_singleton_iff_inner_right.mp w.2 have hw : (w : E) ≠ 0 := fun h => hw₀ (Submodule.coe_eq_zero.mp h) refine le_of_mul_le_mul_right ?_ (by rwa [norm_pos_iff] : 0 < ‖(w : E)‖) rw [← o.abs_areaForm_of_orthogonal hw'] rw [← o.inner_rightAngleRotationAux₁_left x w] exact abs_real_inner_le_norm (o.rightAngleRotationAux₁ x) w } #align orientation.right_angle_rotation_aux₂ Orientation.rightAngleRotationAux₂ @[simp] theorem rightAngleRotationAux₁_rightAngleRotationAux₁ (x : E) : o.rightAngleRotationAux₁ (o.rightAngleRotationAux₁ x) = -x := by apply ext_inner_left ℝ intro y have : ⟪o.rightAngleRotationAux₁ y, o.rightAngleRotationAux₁ x⟫ = ⟪y, x⟫ := LinearIsometry.inner_map_map o.rightAngleRotationAux₂ y x rw [o.inner_rightAngleRotationAux₁_right, ← o.inner_rightAngleRotationAux₁_left, this, inner_neg_right] #align orientation.right_angle_rotation_aux₁_right_angle_rotation_aux₁ Orientation.rightAngleRotationAux₁_rightAngleRotationAux₁ irreducible_def rightAngleRotation : E ≃ₗᵢ[ℝ] E := LinearIsometryEquiv.ofLinearIsometry o.rightAngleRotationAux₂ (-o.rightAngleRotationAux₁) (by ext; simp [rightAngleRotationAux₂]) (by ext; simp [rightAngleRotationAux₂]) #align orientation.right_angle_rotation Orientation.rightAngleRotation local notation "J" => o.rightAngleRotation @[simp]	Mathlib/Analysis/InnerProductSpace/TwoDim.lean	262	264	theorem inner_rightAngleRotation_left (x y : E) : ⟪J x, y⟫ = ω x y := by	rw [rightAngleRotation] exact o.inner_rightAngleRotationAux₁_left x y
import Mathlib.Algebra.Homology.ShortComplex.ModuleCat import Mathlib.RepresentationTheory.GroupCohomology.Basic import Mathlib.RepresentationTheory.Invariants universe v u noncomputable section open CategoryTheory Limits Representation variable {k G : Type u} [CommRing k] [Group G] (A : Rep k G) namespace groupCohomology section Differentials @[simps] def dZero : A →ₗ[k] G → A where toFun m g := A.ρ g m - m map_add' x y := funext fun g => by simp only [map_add, add_sub_add_comm]; rfl map_smul' r x := funext fun g => by dsimp; rw [map_smul, smul_sub]	Mathlib/RepresentationTheory/GroupCohomology/LowDegree.lean	100	103	theorem dZero_ker_eq_invariants : LinearMap.ker (dZero A) = invariants A.ρ := by	ext x simp only [LinearMap.mem_ker, mem_invariants, ← @sub_eq_zero _ _ _ x, Function.funext_iff] rfl
import Mathlib.FieldTheory.Finite.Basic #align_import field_theory.chevalley_warning from "leanprover-community/mathlib"@"e001509c11c4d0f549d91d89da95b4a0b43c714f" universe u v section FiniteField open MvPolynomial open Function hiding eval open Finset FiniteField variable {K σ ι : Type} [Fintype K] [Field K] [Fintype σ] [DecidableEq σ] local notation "q" => Fintype.card K theorem MvPolynomial.sum_eval_eq_zero (f : MvPolynomial σ K) (h : f.totalDegree < (q - 1) Fintype.card σ) : ∑ x, eval x f = 0 := by haveI : DecidableEq K := Classical.decEq K calc ∑ x, eval x f = ∑ x : σ → K, ∑ d ∈ f.support, f.coeff d * ∏ i, x i ^ d i := by simp only [eval_eq'] _ = ∑ d ∈ f.support, ∑ x : σ → K, f.coeff d * ∏ i, x i ^ d i := sum_comm _ = 0 := sum_eq_zero ?_ intro d hd obtain ⟨i, hi⟩ : ∃ i, d i < q - 1 := f.exists_degree_lt (q - 1) h hd calc (∑ x : σ → K, f.coeff d * ∏ i, x i ^ d i) = f.coeff d * ∑ x : σ → K, ∏ i, x i ^ d i := (mul_sum ..).symm _ = 0 := (mul_eq_zero.mpr ∘ Or.inr) ?_ calc (∑ x : σ → K, ∏ i, x i ^ d i) = ∑ x₀ : { j // j ≠ i } → K, ∑ x : { x : σ → K // x ∘ (↑) = x₀ }, ∏ j, (x : σ → K) j ^ d j := (Fintype.sum_fiberwise _ _).symm _ = 0 := Fintype.sum_eq_zero _ ?_ intro x₀ let e : K ≃ { x // x ∘ ((↑) : _ → σ) = x₀ } := (Equiv.subtypeEquivCodomain _).symm calc (∑ x : { x : σ → K // x ∘ (↑) = x₀ }, ∏ j, (x : σ → K) j ^ d j) = ∑ a : K, ∏ j : σ, (e a : σ → K) j ^ d j := (e.sum_comp _).symm _ = ∑ a : K, (∏ j, x₀ j ^ d j) * a ^ d i := Fintype.sum_congr _ _ ?_ _ = (∏ j, x₀ j ^ d j) * ∑ a : K, a ^ d i := by rw [mul_sum] _ = 0 := by rw [sum_pow_lt_card_sub_one K _ hi, mul_zero] intro a let e' : Sum { j // j = i } { j // j ≠ i } ≃ σ := Equiv.sumCompl _ letI : Unique { j // j = i } := { default := ⟨i, rfl⟩ uniq := fun ⟨j, h⟩ => Subtype.val_injective h } calc (∏ j : σ, (e a : σ → K) j ^ d j) = (e a : σ → K) i ^ d i * ∏ j : { j // j ≠ i }, (e a : σ → K) j ^ d j := by rw [← e'.prod_comp, Fintype.prod_sum_type, univ_unique, prod_singleton]; rfl _ = a ^ d i * ∏ j : { j // j ≠ i }, (e a : σ → K) j ^ d j := by rw [Equiv.subtypeEquivCodomain_symm_apply_eq] _ = a ^ d i * ∏ j, x₀ j ^ d j := congr_arg _ (Fintype.prod_congr _ _ ?_) -- see below _ = (∏ j, x₀ j ^ d j) * a ^ d i := mul_comm _ _ -- the remaining step of the calculation above rintro ⟨j, hj⟩ show (e a : σ → K) j ^ d j = x₀ ⟨j, hj⟩ ^ d j rw [Equiv.subtypeEquivCodomain_symm_apply_ne] #align mv_polynomial.sum_eval_eq_zero MvPolynomial.sum_eval_eq_zero variable [DecidableEq K] (p : ℕ) [CharP K p] theorem char_dvd_card_solutions_of_sum_lt {s : Finset ι} {f : ι → MvPolynomial σ K} (h : (∑ i ∈ s, (f i).totalDegree) < Fintype.card σ) : p ∣ Fintype.card { x : σ → K // ∀ i ∈ s, eval x (f i) = 0 } := by have hq : 0 < q - 1 := by rw [← Fintype.card_units, Fintype.card_pos_iff]; exact ⟨1⟩ let S : Finset (σ → K) := { x ∈ univ \| ∀ i ∈ s, eval x (f i) = 0 }.toFinset have hS : ∀ x : σ → K, x ∈ S ↔ ∀ i : ι, i ∈ s → eval x (f i) = 0 := by intro x simp only [S, Set.toFinset_setOf, mem_univ, true_and, mem_filter] let F : MvPolynomial σ K := ∏ i ∈ s, (1 - f i ^ (q - 1)) have hF : ∀ x, eval x F = if x ∈ S then 1 else 0 := by intro x calc eval x F = ∏ i ∈ s, eval x (1 - f i ^ (q - 1)) := eval_prod s _ x _ = if x ∈ S then 1 else 0 := ?_ simp only [(eval x).map_sub, (eval x).map_pow, (eval x).map_one] split_ifs with hx · apply Finset.prod_eq_one intro i hi rw [hS] at hx rw [hx i hi, zero_pow hq.ne', sub_zero] · obtain ⟨i, hi, hx⟩ : ∃ i ∈ s, eval x (f i) ≠ 0 := by simpa [hS, not_forall, Classical.not_imp] using hx apply Finset.prod_eq_zero hi rw [pow_card_sub_one_eq_one (eval x (f i)) hx, sub_self] -- In particular, we can now show: have key : ∑ x, eval x F = Fintype.card { x : σ → K // ∀ i ∈ s, eval x (f i) = 0 } := by rw [Fintype.card_of_subtype S hS, card_eq_sum_ones, Nat.cast_sum, Nat.cast_one, ← Fintype.sum_extend_by_zero S, sum_congr rfl fun x _ => hF x] -- With these preparations under our belt, we will approach the main goal. show p ∣ Fintype.card { x // ∀ i : ι, i ∈ s → eval x (f i) = 0 } rw [← CharP.cast_eq_zero_iff K, ← key] show (∑ x, eval x F) = 0 -- We are now ready to apply the main machine, proven before. apply F.sum_eval_eq_zero -- It remains to verify the crucial assumption of this machine show F.totalDegree < (q - 1) * Fintype.card σ calc F.totalDegree ≤ ∑ i ∈ s, (1 - f i ^ (q - 1)).totalDegree := totalDegree_finset_prod s _ _ ≤ ∑ i ∈ s, (q - 1) * (f i).totalDegree := sum_le_sum fun i _ => ?_ -- see ↓ _ = (q - 1) * ∑ i ∈ s, (f i).totalDegree := (mul_sum ..).symm _ < (q - 1) * Fintype.card σ := by rwa [mul_lt_mul_left hq] -- Now we prove the remaining step from the preceding calculation show (1 - f i ^ (q - 1)).totalDegree ≤ (q - 1) * (f i).totalDegree calc (1 - f i ^ (q - 1)).totalDegree ≤ max (1 : MvPolynomial σ K).totalDegree (f i ^ (q - 1)).totalDegree := totalDegree_sub _ _ _ ≤ (f i ^ (q - 1)).totalDegree := by simp _ ≤ (q - 1) * (f i).totalDegree := totalDegree_pow _ _ #align char_dvd_card_solutions_of_sum_lt char_dvd_card_solutions_of_sum_lt theorem char_dvd_card_solutions_of_fintype_sum_lt [Fintype ι] {f : ι → MvPolynomial σ K} (h : (∑ i, (f i).totalDegree) < Fintype.card σ) : p ∣ Fintype.card { x : σ → K // ∀ i, eval x (f i) = 0 } := by simpa using char_dvd_card_solutions_of_sum_lt p h #align char_dvd_card_solutions_of_fintype_sum_lt char_dvd_card_solutions_of_fintype_sum_lt	Mathlib/FieldTheory/ChevalleyWarning.lean	180	188	theorem char_dvd_card_solutions {f : MvPolynomial σ K} (h : f.totalDegree < Fintype.card σ) : p ∣ Fintype.card { x : σ → K // eval x f = 0 } := by	let F : Unit → MvPolynomial σ K := fun _ => f have : (∑ i : Unit, (F i).totalDegree) < Fintype.card σ := h -- Porting note: was -- `simpa only [F, Fintype.univ_punit, forall_eq, mem_singleton] using` -- ` char_dvd_card_solutions_of_sum_lt p this` convert char_dvd_card_solutions_of_sum_lt p this aesop
import Batteries.Tactic.Lint.Basic import Mathlib.Algebra.Order.Monoid.Unbundled.Basic import Mathlib.Algebra.Order.Ring.Defs import Mathlib.Algebra.Order.ZeroLEOne import Mathlib.Data.Nat.Cast.Order import Mathlib.Init.Data.Int.Order set_option autoImplicit true namespace Linarith theorem lt_irrefl {α : Type u} [Preorder α] {a : α} : ¬a < a := _root_.lt_irrefl a theorem eq_of_eq_of_eq {α} [OrderedSemiring α] {a b : α} (ha : a = 0) (hb : b = 0) : a + b = 0 := by simp [*]	Mathlib/Tactic/Linarith/Lemmas.lean	30	31	theorem le_of_eq_of_le {α} [OrderedSemiring α] {a b : α} (ha : a = 0) (hb : b ≤ 0) : a + b ≤ 0 := by	simp [*]
import Mathlib.Analysis.SpecialFunctions.Log.Deriv import Mathlib.MeasureTheory.Integral.FundThmCalculus #align_import analysis.special_functions.non_integrable from "leanprover-community/mathlib"@"55ec6e9af7d3e0043f57e394cb06a72f6275273e" open scoped MeasureTheory Topology Interval NNReal ENNReal open MeasureTheory TopologicalSpace Set Filter Asymptotics intervalIntegral variable {E F : Type} [NormedAddCommGroup E] [NormedSpace ℝ E] [NormedAddCommGroup F] theorem not_integrableOn_of_tendsto_norm_atTop_of_deriv_isBigO_filter_aux [CompleteSpace E] {f : ℝ → E} {g : ℝ → F} {k : Set ℝ} (l : Filter ℝ) [NeBot l] [TendstoIxxClass Icc l l] (hl : k ∈ l) (hd : ∀ᶠ x in l, DifferentiableAt ℝ f x) (hf : Tendsto (fun x => ‖f x‖) l atTop) (hfg : deriv f =O[l] g) : ¬IntegrableOn g k := by intro hgi obtain ⟨C, hC₀, s, hsl, hsub, hfd, hg⟩ : ∃ (C : ℝ) (_ : 0 ≤ C), ∃ s ∈ l, (∀ x ∈ s, ∀ y ∈ s, [[x, y]] ⊆ k) ∧ (∀ x ∈ s, ∀ y ∈ s, ∀ z ∈ [[x, y]], DifferentiableAt ℝ f z) ∧ ∀ x ∈ s, ∀ y ∈ s, ∀ z ∈ [[x, y]], ‖deriv f z‖ ≤ C ‖g z‖ := by rcases hfg.exists_nonneg with ⟨C, C₀, hC⟩ have h : ∀ᶠ x : ℝ × ℝ in l.prod l, ∀ y ∈ [[x.1, x.2]], (DifferentiableAt ℝ f y ∧ ‖deriv f y‖ ≤ C * ‖g y‖) ∧ y ∈ k := (tendsto_fst.uIcc tendsto_snd).eventually ((hd.and hC.bound).and hl).smallSets rcases mem_prod_self_iff.1 h with ⟨s, hsl, hs⟩ simp only [prod_subset_iff, mem_setOf_eq] at hs exact ⟨C, C₀, s, hsl, fun x hx y hy z hz => (hs x hx y hy z hz).2, fun x hx y hy z hz => (hs x hx y hy z hz).1.1, fun x hx y hy z hz => (hs x hx y hy z hz).1.2⟩ replace hgi : IntegrableOn (fun x ↦ C * ‖g x‖) k := by exact hgi.norm.smul C obtain ⟨c, hc, d, hd, hlt⟩ : ∃ c ∈ s, ∃ d ∈ s, (‖f c‖ + ∫ y in k, C * ‖g y‖) < ‖f d‖ := by rcases Filter.nonempty_of_mem hsl with ⟨c, hc⟩ have : ∀ᶠ x in l, (‖f c‖ + ∫ y in k, C * ‖g y‖) < ‖f x‖ := hf.eventually (eventually_gt_atTop _) exact ⟨c, hc, (this.and hsl).exists.imp fun d hd => ⟨hd.2, hd.1⟩⟩ specialize hsub c hc d hd; specialize hfd c hc d hd replace hg : ∀ x ∈ Ι c d, ‖deriv f x‖ ≤ C * ‖g x‖ := fun z hz => hg c hc d hd z ⟨hz.1.le, hz.2⟩ have hg_ae : ∀ᵐ x ∂volume.restrict (Ι c d), ‖deriv f x‖ ≤ C * ‖g x‖ := (ae_restrict_mem measurableSet_uIoc).mono hg have hsub' : Ι c d ⊆ k := Subset.trans Ioc_subset_Icc_self hsub have hfi : IntervalIntegrable (deriv f) volume c d := by rw [intervalIntegrable_iff] have : IntegrableOn (fun x ↦ C * ‖g x‖) (Ι c d) := IntegrableOn.mono hgi hsub' le_rfl exact Integrable.mono' this (aestronglyMeasurable_deriv _ _) hg_ae refine hlt.not_le (sub_le_iff_le_add'.1 ?_) calc ‖f d‖ - ‖f c‖ ≤ ‖f d - f c‖ := norm_sub_norm_le _ _ _ = ‖∫ x in c..d, deriv f x‖ := congr_arg _ (integral_deriv_eq_sub hfd hfi).symm _ = ‖∫ x in Ι c d, deriv f x‖ := norm_integral_eq_norm_integral_Ioc _ _ ≤ ∫ x in Ι c d, ‖deriv f x‖ := norm_integral_le_integral_norm _ _ ≤ ∫ x in Ι c d, C * ‖g x‖ := setIntegral_mono_on hfi.norm.def' (hgi.mono_set hsub') measurableSet_uIoc hg _ ≤ ∫ x in k, C * ‖g x‖ := by apply setIntegral_mono_set hgi (ae_of_all _ fun x => mul_nonneg hC₀ (norm_nonneg _)) hsub'.eventuallyLE theorem not_integrableOn_of_tendsto_norm_atTop_of_deriv_isBigO_filter {f : ℝ → E} {g : ℝ → F} {k : Set ℝ} (l : Filter ℝ) [NeBot l] [TendstoIxxClass Icc l l] (hl : k ∈ l) (hd : ∀ᶠ x in l, DifferentiableAt ℝ f x) (hf : Tendsto (fun x => ‖f x‖) l atTop) (hfg : deriv f =O[l] g) : ¬IntegrableOn g k := by let a : E →ₗᵢ[ℝ] UniformSpace.Completion E := UniformSpace.Completion.toComplₗᵢ let f' := a ∘ f have h'd : ∀ᶠ x in l, DifferentiableAt ℝ f' x := by filter_upwards [hd] with x hx using a.toContinuousLinearMap.differentiableAt.comp x hx have h'f : Tendsto (fun x => ‖f' x‖) l atTop := hf.congr (fun x ↦ by simp [f']) have h'fg : deriv f' =O[l] g := by apply IsBigO.trans _ hfg rw [← isBigO_norm_norm] suffices (fun x ↦ ‖deriv f' x‖) =ᶠ[l] (fun x ↦ ‖deriv f x‖) by exact this.isBigO filter_upwards [hd] with x hx have : deriv f' x = a (deriv f x) := by rw [fderiv.comp_deriv x _ hx] · have : fderiv ℝ a (f x) = a.toContinuousLinearMap := a.toContinuousLinearMap.fderiv simp only [this] rfl · exact a.toContinuousLinearMap.differentiableAt simp only [this] simp exact not_integrableOn_of_tendsto_norm_atTop_of_deriv_isBigO_filter_aux l hl h'd h'f h'fg	Mathlib/Analysis/SpecialFunctions/NonIntegrable.lean	127	132	theorem not_intervalIntegrable_of_tendsto_norm_atTop_of_deriv_isBigO_filter {f : ℝ → E} {g : ℝ → F} {a b : ℝ} (l : Filter ℝ) [NeBot l] [TendstoIxxClass Icc l l] (hl : [[a, b]] ∈ l) (hd : ∀ᶠ x in l, DifferentiableAt ℝ f x) (hf : Tendsto (fun x => ‖f x‖) l atTop) (hfg : deriv f =O[l] g) : ¬IntervalIntegrable g volume a b := by	rw [intervalIntegrable_iff'] exact not_integrableOn_of_tendsto_norm_atTop_of_deriv_isBigO_filter _ hl hd hf hfg
import Mathlib.Topology.MetricSpace.Basic #align_import topology.metric_space.infsep from "leanprover-community/mathlib"@"5316314b553dcf8c6716541851517c1a9715e22b" variable {α β : Type*} namespace Set section Einfsep open ENNReal open Function noncomputable def einfsep [EDist α] (s : Set α) : ℝ≥0∞ := ⨅ (x ∈ s) (y ∈ s) (_ : x ≠ y), edist x y #align set.einfsep Set.einfsep section EDist variable [EDist α] {x y : α} {s t : Set α} theorem le_einfsep_iff {d} : d ≤ s.einfsep ↔ ∀ x ∈ s, ∀ y ∈ s, x ≠ y → d ≤ edist x y := by simp_rw [einfsep, le_iInf_iff] #align set.le_einfsep_iff Set.le_einfsep_iff theorem einfsep_zero : s.einfsep = 0 ↔ ∀ C > 0, ∃ x ∈ s, ∃ y ∈ s, x ≠ y ∧ edist x y < C := by simp_rw [einfsep, ← _root_.bot_eq_zero, iInf_eq_bot, iInf_lt_iff, exists_prop] #align set.einfsep_zero Set.einfsep_zero theorem einfsep_pos : 0 < s.einfsep ↔ ∃ C > 0, ∀ x ∈ s, ∀ y ∈ s, x ≠ y → C ≤ edist x y := by rw [pos_iff_ne_zero, Ne, einfsep_zero] simp only [not_forall, not_exists, not_lt, exists_prop, not_and] #align set.einfsep_pos Set.einfsep_pos theorem einfsep_top : s.einfsep = ∞ ↔ ∀ x ∈ s, ∀ y ∈ s, x ≠ y → edist x y = ∞ := by simp_rw [einfsep, iInf_eq_top] #align set.einfsep_top Set.einfsep_top theorem einfsep_lt_top : s.einfsep < ∞ ↔ ∃ x ∈ s, ∃ y ∈ s, x ≠ y ∧ edist x y < ∞ := by simp_rw [einfsep, iInf_lt_iff, exists_prop] #align set.einfsep_lt_top Set.einfsep_lt_top theorem einfsep_ne_top : s.einfsep ≠ ∞ ↔ ∃ x ∈ s, ∃ y ∈ s, x ≠ y ∧ edist x y ≠ ∞ := by simp_rw [← lt_top_iff_ne_top, einfsep_lt_top] #align set.einfsep_ne_top Set.einfsep_ne_top theorem einfsep_lt_iff {d} : s.einfsep < d ↔ ∃ x ∈ s, ∃ y ∈ s, x ≠ y ∧ edist x y < d := by simp_rw [einfsep, iInf_lt_iff, exists_prop] #align set.einfsep_lt_iff Set.einfsep_lt_iff theorem nontrivial_of_einfsep_lt_top (hs : s.einfsep < ∞) : s.Nontrivial := by rcases einfsep_lt_top.1 hs with ⟨_, hx, _, hy, hxy, _⟩ exact ⟨_, hx, _, hy, hxy⟩ #align set.nontrivial_of_einfsep_lt_top Set.nontrivial_of_einfsep_lt_top theorem nontrivial_of_einfsep_ne_top (hs : s.einfsep ≠ ∞) : s.Nontrivial := nontrivial_of_einfsep_lt_top (lt_top_iff_ne_top.mpr hs) #align set.nontrivial_of_einfsep_ne_top Set.nontrivial_of_einfsep_ne_top theorem Subsingleton.einfsep (hs : s.Subsingleton) : s.einfsep = ∞ := by rw [einfsep_top] exact fun _ hx _ hy hxy => (hxy <\| hs hx hy).elim #align set.subsingleton.einfsep Set.Subsingleton.einfsep	Mathlib/Topology/MetricSpace/Infsep.lean	98	100	theorem le_einfsep_image_iff {d} {f : β → α} {s : Set β} : d ≤ einfsep (f '' s) ↔ ∀ x ∈ s, ∀ y ∈ s, f x ≠ f y → d ≤ edist (f x) (f y) := by	simp_rw [le_einfsep_iff, forall_mem_image]
import Mathlib.LinearAlgebra.AffineSpace.Basis import Mathlib.LinearAlgebra.Matrix.NonsingularInverse #align_import linear_algebra.affine_space.matrix from "leanprover-community/mathlib"@"2de9c37fa71dde2f1c6feff19876dd6a7b1519f0" open Affine Matrix open Set universe u₁ u₂ u₃ u₄ variable {ι : Type u₁} {k : Type u₂} {V : Type u₃} {P : Type u₄} variable [AddCommGroup V] [AffineSpace V P] namespace AffineBasis section Ring variable [Ring k] [Module k V] (b : AffineBasis ι k P) noncomputable def toMatrix {ι' : Type} (q : ι' → P) : Matrix ι' ι k := fun i j => b.coord j (q i) #align affine_basis.to_matrix AffineBasis.toMatrix @[simp] theorem toMatrix_apply {ι' : Type} (q : ι' → P) (i : ι') (j : ι) : b.toMatrix q i j = b.coord j (q i) := rfl #align affine_basis.to_matrix_apply AffineBasis.toMatrix_apply @[simp] theorem toMatrix_self [DecidableEq ι] : b.toMatrix b = (1 : Matrix ι ι k) := by ext i j rw [toMatrix_apply, coord_apply, Matrix.one_eq_pi_single, Pi.single_apply] #align affine_basis.to_matrix_self AffineBasis.toMatrix_self variable {ι' : Type} theorem toMatrix_row_sum_one [Fintype ι] (q : ι' → P) (i : ι') : ∑ j, b.toMatrix q i j = 1 := by simp #align affine_basis.to_matrix_row_sum_one AffineBasis.toMatrix_row_sum_one theorem affineIndependent_of_toMatrix_right_inv [Fintype ι] [Finite ι'] [DecidableEq ι'] (p : ι' → P) {A : Matrix ι ι' k} (hA : b.toMatrix p A = 1) : AffineIndependent k p := by cases nonempty_fintype ι' rw [affineIndependent_iff_eq_of_fintype_affineCombination_eq] intro w₁ w₂ hw₁ hw₂ hweq have hweq' : w₁ ᵥ* b.toMatrix p = w₂ ᵥ* b.toMatrix p := by ext j change (∑ i, w₁ i • b.coord j (p i)) = ∑ i, w₂ i • b.coord j (p i) -- Porting note: Added `u` because `∘` was causing trouble have u : (fun i => b.coord j (p i)) = b.coord j ∘ p := by simp only [(· ∘ ·)] rw [← Finset.univ.affineCombination_eq_linear_combination _ _ hw₁, ← Finset.univ.affineCombination_eq_linear_combination _ _ hw₂, u, ← Finset.univ.map_affineCombination p w₁ hw₁, ← Finset.univ.map_affineCombination p w₂ hw₂, hweq] replace hweq' := congr_arg (fun w => w ᵥ* A) hweq' simpa only [Matrix.vecMul_vecMul, hA, Matrix.vecMul_one] using hweq' #align affine_basis.affine_independent_of_to_matrix_right_inv AffineBasis.affineIndependent_of_toMatrix_right_inv theorem affineSpan_eq_top_of_toMatrix_left_inv [Finite ι] [Fintype ι'] [DecidableEq ι] [Nontrivial k] (p : ι' → P) {A : Matrix ι ι' k} (hA : A * b.toMatrix p = 1) : affineSpan k (range p) = ⊤ := by cases nonempty_fintype ι suffices ∀ i, b i ∈ affineSpan k (range p) by rw [eq_top_iff, ← b.tot, affineSpan_le] rintro q ⟨i, rfl⟩ exact this i intro i have hAi : ∑ j, A i j = 1 := by calc ∑ j, A i j = ∑ j, A i j * ∑ l, b.toMatrix p j l := by simp _ = ∑ j, ∑ l, A i j * b.toMatrix p j l := by simp_rw [Finset.mul_sum] _ = ∑ l, ∑ j, A i j * b.toMatrix p j l := by rw [Finset.sum_comm] _ = ∑ l, (A * b.toMatrix p) i l := rfl _ = 1 := by simp [hA, Matrix.one_apply, Finset.filter_eq] have hbi : b i = Finset.univ.affineCombination k p (A i) := by apply b.ext_elem intro j rw [b.coord_apply, Finset.univ.map_affineCombination _ _ hAi, Finset.univ.affineCombination_eq_linear_combination _ _ hAi] change _ = (A * b.toMatrix p) i j simp_rw [hA, Matrix.one_apply, @eq_comm _ i j] rw [hbi] exact affineCombination_mem_affineSpan hAi p #align affine_basis.affine_span_eq_top_of_to_matrix_left_inv AffineBasis.affineSpan_eq_top_of_toMatrix_left_inv variable [Fintype ι] (b₂ : AffineBasis ι k P) @[simp] theorem toMatrix_vecMul_coords (x : P) : b₂.coords x ᵥ* b.toMatrix b₂ = b.coords x := by ext j change _ = b.coord j x conv_rhs => rw [← b₂.affineCombination_coord_eq_self x] rw [Finset.map_affineCombination _ _ _ (b₂.sum_coord_apply_eq_one x)] simp [Matrix.vecMul, Matrix.dotProduct, toMatrix_apply, coords] #align affine_basis.to_matrix_vec_mul_coords AffineBasis.toMatrix_vecMul_coords variable [DecidableEq ι] theorem toMatrix_mul_toMatrix : b.toMatrix b₂ * b₂.toMatrix b = 1 := by ext l m change (b.coords (b₂ l) ᵥ* b₂.toMatrix b) m = _ rw [toMatrix_vecMul_coords, coords_apply, ← toMatrix_apply, toMatrix_self] #align affine_basis.to_matrix_mul_to_matrix AffineBasis.toMatrix_mul_toMatrix theorem isUnit_toMatrix : IsUnit (b.toMatrix b₂) := ⟨{ val := b.toMatrix b₂ inv := b₂.toMatrix b val_inv := b.toMatrix_mul_toMatrix b₂ inv_val := b₂.toMatrix_mul_toMatrix b }, rfl⟩ #align affine_basis.is_unit_to_matrix AffineBasis.isUnit_toMatrix	Mathlib/LinearAlgebra/AffineSpace/Matrix.lean	137	146	theorem isUnit_toMatrix_iff [Nontrivial k] (p : ι → P) : IsUnit (b.toMatrix p) ↔ AffineIndependent k p ∧ affineSpan k (range p) = ⊤ := by	constructor · rintro ⟨⟨B, A, hA, hA'⟩, rfl : B = b.toMatrix p⟩ exact ⟨b.affineIndependent_of_toMatrix_right_inv p hA, b.affineSpan_eq_top_of_toMatrix_left_inv p hA'⟩ · rintro ⟨h_tot, h_ind⟩ let b' : AffineBasis ι k P := ⟨p, h_tot, h_ind⟩ change IsUnit (b.toMatrix b') exact b.isUnit_toMatrix b'
import Mathlib.Data.Int.Cast.Lemmas import Mathlib.Tactic.NormNum.Basic set_option autoImplicit true namespace Mathlib open Lean hiding Rat mkRat open Meta namespace Meta.NormNum open Qq theorem natPow_zero : Nat.pow a (nat_lit 0) = nat_lit 1 := rfl theorem natPow_one : Nat.pow a (nat_lit 1) = a := Nat.pow_one _ theorem zero_natPow : Nat.pow (nat_lit 0) (Nat.succ b) = nat_lit 0 := rfl theorem one_natPow : Nat.pow (nat_lit 1) b = nat_lit 1 := Nat.one_pow _ structure IsNatPowT (p : Prop) (a b c : Nat) : Prop where run' : p → Nat.pow a b = c theorem IsNatPowT.run (p : IsNatPowT (Nat.pow a (nat_lit 1) = a) a b c) : Nat.pow a b = c := p.run' (Nat.pow_one _) theorem IsNatPowT.trans (h1 : IsNatPowT p a b c) (h2 : IsNatPowT (Nat.pow a b = c) a b' c') : IsNatPowT p a b' c' := ⟨h2.run' ∘ h1.run'⟩ theorem IsNatPowT.bit0 : IsNatPowT (Nat.pow a b = c) a (nat_lit 2 * b) (Nat.mul c c) := ⟨fun h1 => by simp [two_mul, pow_add, ← h1]⟩ theorem IsNatPowT.bit1 : IsNatPowT (Nat.pow a b = c) a (nat_lit 2 * b + nat_lit 1) (Nat.mul c (Nat.mul c a)) := ⟨fun h1 => by simp [two_mul, pow_add, mul_assoc, ← h1]⟩ partial def evalNatPow (a b : Q(ℕ)) : (c : Q(ℕ)) × Q(Nat.pow $a $b = $c) := if b.natLit! = 0 then haveI : $b =Q 0 := ⟨⟩ ⟨q(nat_lit 1), q(natPow_zero)⟩ else if a.natLit! = 0 then haveI : $a =Q 0 := ⟨⟩ have b' : Q(ℕ) := mkRawNatLit (b.natLit! - 1) haveI : $b =Q Nat.succ $b' := ⟨⟩ ⟨q(nat_lit 0), q(zero_natPow)⟩ else if a.natLit! = 1 then haveI : $a =Q 1 := ⟨⟩ ⟨q(nat_lit 1), q(one_natPow)⟩ else if b.natLit! = 1 then haveI : $b =Q 1 := ⟨⟩ ⟨a, q(natPow_one)⟩ else let ⟨c, p⟩ := go b.natLit!.log2 a (mkRawNatLit 1) a b _ .rfl ⟨c, q(($p).run)⟩ where go (depth : Nat) (a b₀ c₀ b : Q(ℕ)) (p : Q(Prop)) (hp : $p =Q (Nat.pow $a $b₀ = $c₀)) : (c : Q(ℕ)) × Q(IsNatPowT $p $a $b $c) := let b' := b.natLit! if depth ≤ 1 then let a' := a.natLit! let c₀' := c₀.natLit! if b' &&& 1 == 0 then have c : Q(ℕ) := mkRawNatLit (c₀' * c₀') haveI : $c =Q Nat.mul $c₀ $c₀ := ⟨⟩ haveI : $b =Q 2 * $b₀ := ⟨⟩ ⟨c, q(IsNatPowT.bit0)⟩ else have c : Q(ℕ) := mkRawNatLit (c₀' * (c₀' * a')) haveI : $c =Q Nat.mul $c₀ (Nat.mul $c₀ $a) := ⟨⟩ haveI : $b =Q 2 * $b₀ + 1 := ⟨⟩ ⟨c, q(IsNatPowT.bit1)⟩ else let d := depth >>> 1 have hi : Q(ℕ) := mkRawNatLit (b' >>> d) let ⟨c1, p1⟩ := go (depth - d) a b₀ c₀ hi p (by exact hp) let ⟨c2, p2⟩ := go d a hi c1 b q(Nat.pow $a $hi = $c1) ⟨⟩ ⟨c2, q(($p1).trans $p2)⟩ theorem intPow_ofNat (h1 : Nat.pow a b = c) : Int.pow (Int.ofNat a) b = Int.ofNat c := by simp [← h1]	Mathlib/Tactic/NormNum/Pow.lean	105	110	theorem intPow_negOfNat_bit0 (h1 : Nat.pow a b' = c') (hb : nat_lit 2 * b' = b) (hc : c' * c' = c) : Int.pow (Int.negOfNat a) b = Int.ofNat c := by	rw [← hb, Int.negOfNat_eq, Int.pow_eq, pow_mul, neg_pow_two, ← pow_mul, two_mul, pow_add, ← hc, ← h1] simp
import Mathlib.Algebra.Bounds import Mathlib.Algebra.Order.Archimedean import Mathlib.Data.Real.Basic import Mathlib.Order.Interval.Set.Disjoint #align_import data.real.basic from "leanprover-community/mathlib"@"cb42593171ba005beaaf4549fcfe0dece9ada4c9" open scoped Classical open Pointwise CauSeq namespace Real instance instArchimedean : Archimedean ℝ := archimedean_iff_rat_le.2 fun x => Real.ind_mk x fun f => let ⟨M, _, H⟩ := f.bounded' 0 ⟨M, mk_le_of_forall_le ⟨0, fun i _ => Rat.cast_le.2 <\| le_of_lt (abs_lt.1 (H i)).2⟩⟩ #align real.archimedean Real.instArchimedean noncomputable instance : FloorRing ℝ := Archimedean.floorRing _ theorem isCauSeq_iff_lift {f : ℕ → ℚ} : IsCauSeq abs f ↔ IsCauSeq abs fun i => (f i : ℝ) where mp H ε ε0 := let ⟨δ, δ0, δε⟩ := exists_pos_rat_lt ε0 (H _ δ0).imp fun i hi j ij => by dsimp; exact lt_trans (mod_cast hi _ ij) δε mpr H ε ε0 := (H _ (Rat.cast_pos.2 ε0)).imp fun i hi j ij => by dsimp at hi; exact mod_cast hi _ ij #align real.is_cau_seq_iff_lift Real.isCauSeq_iff_lift theorem of_near (f : ℕ → ℚ) (x : ℝ) (h : ∀ ε > 0, ∃ i, ∀ j ≥ i, \|(f j : ℝ) - x\| < ε) : ∃ h', Real.mk ⟨f, h'⟩ = x := ⟨isCauSeq_iff_lift.2 (CauSeq.of_near _ (const abs x) h), sub_eq_zero.1 <\| abs_eq_zero.1 <\| (eq_of_le_of_forall_le_of_dense (abs_nonneg _)) fun _ε ε0 => mk_near_of_forall_near <\| (h _ ε0).imp fun _i h j ij => le_of_lt (h j ij)⟩ #align real.of_near Real.of_near theorem exists_floor (x : ℝ) : ∃ ub : ℤ, (ub : ℝ) ≤ x ∧ ∀ z : ℤ, (z : ℝ) ≤ x → z ≤ ub := Int.exists_greatest_of_bdd (let ⟨n, hn⟩ := exists_int_gt x ⟨n, fun _ h' => Int.cast_le.1 <\| le_trans h' <\| le_of_lt hn⟩) (let ⟨n, hn⟩ := exists_int_lt x ⟨n, le_of_lt hn⟩) #align real.exists_floor Real.exists_floor theorem exists_isLUB {S : Set ℝ} (hne : S.Nonempty) (hbdd : BddAbove S) : ∃ x, IsLUB S x := by rcases hne, hbdd with ⟨⟨L, hL⟩, ⟨U, hU⟩⟩ have : ∀ d : ℕ, BddAbove { m : ℤ \| ∃ y ∈ S, (m : ℝ) ≤ y * d } := by cases' exists_int_gt U with k hk refine fun d => ⟨k * d, fun z h => ?_⟩ rcases h with ⟨y, yS, hy⟩ refine Int.cast_le.1 (hy.trans ?_) push_cast exact mul_le_mul_of_nonneg_right ((hU yS).trans hk.le) d.cast_nonneg choose f hf using fun d : ℕ => Int.exists_greatest_of_bdd (this d) ⟨⌊L * d⌋, L, hL, Int.floor_le _⟩ have hf₁ : ∀ n > 0, ∃ y ∈ S, ((f n / n : ℚ) : ℝ) ≤ y := fun n n0 => let ⟨y, yS, hy⟩ := (hf n).1 ⟨y, yS, by simpa using (div_le_iff (Nat.cast_pos.2 n0 : (_ : ℝ) < _)).2 hy⟩ have hf₂ : ∀ n > 0, ∀ y ∈ S, (y - ((n : ℕ) : ℝ)⁻¹) < (f n / n : ℚ) := by intro n n0 y yS have := (Int.sub_one_lt_floor _).trans_le (Int.cast_le.2 <\| (hf n).2 _ ⟨y, yS, Int.floor_le _⟩) simp only [Rat.cast_div, Rat.cast_intCast, Rat.cast_natCast, gt_iff_lt] rwa [lt_div_iff (Nat.cast_pos.2 n0 : (_ : ℝ) < _), sub_mul, _root_.inv_mul_cancel] exact ne_of_gt (Nat.cast_pos.2 n0) have hg : IsCauSeq abs (fun n => f n / n : ℕ → ℚ) := by intro ε ε0 suffices ∀ j ≥ ⌈ε⁻¹⌉₊, ∀ k ≥ ⌈ε⁻¹⌉₊, (f j / j - f k / k : ℚ) < ε by refine ⟨_, fun j ij => abs_lt.2 ⟨?_, this _ ij _ le_rfl⟩⟩ rw [neg_lt, neg_sub] exact this _ le_rfl _ ij intro j ij k ik replace ij := le_trans (Nat.le_ceil _) (Nat.cast_le.2 ij) replace ik := le_trans (Nat.le_ceil _) (Nat.cast_le.2 ik) have j0 := Nat.cast_pos.1 ((inv_pos.2 ε0).trans_le ij) have k0 := Nat.cast_pos.1 ((inv_pos.2 ε0).trans_le ik) rcases hf₁ _ j0 with ⟨y, yS, hy⟩ refine lt_of_lt_of_le ((Rat.cast_lt (K := ℝ)).1 ?_) ((inv_le ε0 (Nat.cast_pos.2 k0)).1 ik) simpa using sub_lt_iff_lt_add'.2 (lt_of_le_of_lt hy <\| sub_lt_iff_lt_add.1 <\| hf₂ _ k0 _ yS) let g : CauSeq ℚ abs := ⟨fun n => f n / n, hg⟩ refine ⟨mk g, ⟨fun x xS => ?_, fun y h => ?_⟩⟩ · refine le_of_forall_ge_of_dense fun z xz => ?_ cases' exists_nat_gt (x - z)⁻¹ with K hK refine le_mk_of_forall_le ⟨K, fun n nK => ?_⟩ replace xz := sub_pos.2 xz replace hK := hK.le.trans (Nat.cast_le.2 nK) have n0 : 0 < n := Nat.cast_pos.1 ((inv_pos.2 xz).trans_le hK) refine le_trans ?_ (hf₂ _ n0 _ xS).le rwa [le_sub_comm, inv_le (Nat.cast_pos.2 n0 : (_ : ℝ) < _) xz] · exact mk_le_of_forall_le ⟨1, fun n n1 => let ⟨x, xS, hx⟩ := hf₁ _ n1 le_trans hx (h xS)⟩ #align real.exists_is_lub Real.exists_isLUB theorem exists_isGLB {S : Set ℝ} (hne : S.Nonempty) (hbdd : BddBelow S) : ∃ x, IsGLB S x := by have hne' : (-S).Nonempty := Set.nonempty_neg.mpr hne have hbdd' : BddAbove (-S) := bddAbove_neg.mpr hbdd use -Classical.choose (Real.exists_isLUB hne' hbdd') rw [← isLUB_neg] exact Classical.choose_spec (Real.exists_isLUB hne' hbdd') noncomputable instance : SupSet ℝ := ⟨fun S => if h : S.Nonempty ∧ BddAbove S then Classical.choose (exists_isLUB h.1 h.2) else 0⟩ theorem sSup_def (S : Set ℝ) : sSup S = if h : S.Nonempty ∧ BddAbove S then Classical.choose (exists_isLUB h.1 h.2) else 0 := rfl #align real.Sup_def Real.sSup_def protected theorem isLUB_sSup (S : Set ℝ) (h₁ : S.Nonempty) (h₂ : BddAbove S) : IsLUB S (sSup S) := by simp only [sSup_def, dif_pos (And.intro h₁ h₂)] apply Classical.choose_spec #align real.is_lub_Sup Real.isLUB_sSup noncomputable instance : InfSet ℝ := ⟨fun S => -sSup (-S)⟩ theorem sInf_def (S : Set ℝ) : sInf S = -sSup (-S) := rfl #align real.Inf_def Real.sInf_def protected theorem is_glb_sInf (S : Set ℝ) (h₁ : S.Nonempty) (h₂ : BddBelow S) : IsGLB S (sInf S) := by rw [sInf_def, ← isLUB_neg', neg_neg] exact Real.isLUB_sSup _ h₁.neg h₂.neg #align real.is_glb_Inf Real.is_glb_sInf noncomputable instance : ConditionallyCompleteLinearOrder ℝ := { Real.linearOrder, Real.lattice with sSup := SupSet.sSup sInf := InfSet.sInf le_csSup := fun s a hs ha => (Real.isLUB_sSup s ⟨a, ha⟩ hs).1 ha csSup_le := fun s a hs ha => (Real.isLUB_sSup s hs ⟨a, ha⟩).2 ha csInf_le := fun s a hs ha => (Real.is_glb_sInf s ⟨a, ha⟩ hs).1 ha le_csInf := fun s a hs ha => (Real.is_glb_sInf s hs ⟨a, ha⟩).2 ha csSup_of_not_bddAbove := fun s hs ↦ by simp [hs, sSup_def] csInf_of_not_bddBelow := fun s hs ↦ by simp [hs, sInf_def, sSup_def] } theorem lt_sInf_add_pos {s : Set ℝ} (h : s.Nonempty) {ε : ℝ} (hε : 0 < ε) : ∃ a ∈ s, a < sInf s + ε := exists_lt_of_csInf_lt h <\| lt_add_of_pos_right _ hε #align real.lt_Inf_add_pos Real.lt_sInf_add_pos theorem add_neg_lt_sSup {s : Set ℝ} (h : s.Nonempty) {ε : ℝ} (hε : ε < 0) : ∃ a ∈ s, sSup s + ε < a := exists_lt_of_lt_csSup h <\| add_lt_iff_neg_left.2 hε #align real.add_neg_lt_Sup Real.add_neg_lt_sSup theorem sInf_le_iff {s : Set ℝ} (h : BddBelow s) (h' : s.Nonempty) {a : ℝ} : sInf s ≤ a ↔ ∀ ε, 0 < ε → ∃ x ∈ s, x < a + ε := by rw [le_iff_forall_pos_lt_add] constructor <;> intro H ε ε_pos · exact exists_lt_of_csInf_lt h' (H ε ε_pos) · rcases H ε ε_pos with ⟨x, x_in, hx⟩ exact csInf_lt_of_lt h x_in hx #align real.Inf_le_iff Real.sInf_le_iff theorem le_sSup_iff {s : Set ℝ} (h : BddAbove s) (h' : s.Nonempty) {a : ℝ} : a ≤ sSup s ↔ ∀ ε, ε < 0 → ∃ x ∈ s, a + ε < x := by rw [le_iff_forall_pos_lt_add] refine ⟨fun H ε ε_neg => ?_, fun H ε ε_pos => ?_⟩ · exact exists_lt_of_lt_csSup h' (lt_sub_iff_add_lt.mp (H _ (neg_pos.mpr ε_neg))) · rcases H _ (neg_lt_zero.mpr ε_pos) with ⟨x, x_in, hx⟩ exact sub_lt_iff_lt_add.mp (lt_csSup_of_lt h x_in hx) #align real.le_Sup_iff Real.le_sSup_iff @[simp] theorem sSup_empty : sSup (∅ : Set ℝ) = 0 := dif_neg <\| by simp #align real.Sup_empty Real.sSup_empty @[simp] lemma iSup_of_isEmpty {α : Sort} [IsEmpty α] (f : α → ℝ) : ⨆ i, f i = 0 := by dsimp [iSup] convert Real.sSup_empty rw [Set.range_eq_empty_iff] infer_instance #align real.csupr_empty Real.iSup_of_isEmpty @[simp] theorem ciSup_const_zero {α : Sort} : ⨆ _ : α, (0 : ℝ) = 0 := by cases isEmpty_or_nonempty α · exact Real.iSup_of_isEmpty _ · exact ciSup_const #align real.csupr_const_zero Real.ciSup_const_zero theorem sSup_of_not_bddAbove {s : Set ℝ} (hs : ¬BddAbove s) : sSup s = 0 := dif_neg fun h => hs h.2 #align real.Sup_of_not_bdd_above Real.sSup_of_not_bddAbove theorem iSup_of_not_bddAbove {α : Sort} {f : α → ℝ} (hf : ¬BddAbove (Set.range f)) : ⨆ i, f i = 0 := sSup_of_not_bddAbove hf #align real.supr_of_not_bdd_above Real.iSup_of_not_bddAbove theorem sSup_univ : sSup (@Set.univ ℝ) = 0 := Real.sSup_of_not_bddAbove not_bddAbove_univ #align real.Sup_univ Real.sSup_univ @[simp] theorem sInf_empty : sInf (∅ : Set ℝ) = 0 := by simp [sInf_def, sSup_empty] #align real.Inf_empty Real.sInf_empty @[simp] nonrec lemma iInf_of_isEmpty {α : Sort} [IsEmpty α] (f : α → ℝ) : ⨅ i, f i = 0 := by rw [iInf_of_isEmpty, sInf_empty] #align real.cinfi_empty Real.iInf_of_isEmpty @[simp] theorem ciInf_const_zero {α : Sort} : ⨅ _ : α, (0 : ℝ) = 0 := by cases isEmpty_or_nonempty α · exact Real.iInf_of_isEmpty _ · exact ciInf_const #align real.cinfi_const_zero Real.ciInf_const_zero theorem sInf_of_not_bddBelow {s : Set ℝ} (hs : ¬BddBelow s) : sInf s = 0 := neg_eq_zero.2 <\| sSup_of_not_bddAbove <\| mt bddAbove_neg.1 hs #align real.Inf_of_not_bdd_below Real.sInf_of_not_bddBelow theorem iInf_of_not_bddBelow {α : Sort} {f : α → ℝ} (hf : ¬BddBelow (Set.range f)) : ⨅ i, f i = 0 := sInf_of_not_bddBelow hf #align real.infi_of_not_bdd_below Real.iInf_of_not_bddBelow theorem sSup_nonneg (S : Set ℝ) (hS : ∀ x ∈ S, (0 : ℝ) ≤ x) : 0 ≤ sSup S := by rcases S.eq_empty_or_nonempty with (rfl \| ⟨y, hy⟩) · exact sSup_empty.ge · apply dite _ (fun h => le_csSup_of_le h hy <\| hS y hy) fun h => (sSup_of_not_bddAbove h).ge #align real.Sup_nonneg Real.sSup_nonneg protected theorem iSup_nonneg {ι : Sort} {f : ι → ℝ} (hf : ∀ i, 0 ≤ f i) : 0 ≤ ⨆ i, f i := sSup_nonneg _ <\| Set.forall_mem_range.2 hf #align real.supr_nonneg Real.iSup_nonneg protected theorem sSup_le {S : Set ℝ} {a : ℝ} (hS : ∀ x ∈ S, x ≤ a) (ha : 0 ≤ a) : sSup S ≤ a := by rcases S.eq_empty_or_nonempty with (rfl \| hS₂) exacts [sSup_empty.trans_le ha, csSup_le hS₂ hS] #align real.Sup_le Real.sSup_le protected theorem iSup_le {ι : Sort} {f : ι → ℝ} {a : ℝ} (hS : ∀ i, f i ≤ a) (ha : 0 ≤ a) : ⨆ i, f i ≤ a := Real.sSup_le (Set.forall_mem_range.2 hS) ha #align real.supr_le Real.iSup_le theorem sSup_nonpos (S : Set ℝ) (hS : ∀ x ∈ S, x ≤ (0 : ℝ)) : sSup S ≤ 0 := Real.sSup_le hS le_rfl #align real.Sup_nonpos Real.sSup_nonpos theorem sInf_nonneg (S : Set ℝ) (hS : ∀ x ∈ S, (0 : ℝ) ≤ x) : 0 ≤ sInf S := by rcases S.eq_empty_or_nonempty with (rfl \| hS₂) exacts [sInf_empty.ge, le_csInf hS₂ hS] #align real.Inf_nonneg Real.sInf_nonneg theorem iInf_nonneg {ι} {f : ι → ℝ} (hf : ∀ i, 0 ≤ f i) : 0 ≤ iInf f := sInf_nonneg _ <\| Set.forall_mem_range.2 hf theorem sInf_nonpos (S : Set ℝ) (hS : ∀ x ∈ S, x ≤ (0 : ℝ)) : sInf S ≤ 0 := by rcases S.eq_empty_or_nonempty with (rfl \| ⟨y, hy⟩) · exact sInf_empty.le · apply dite _ (fun h => csInf_le_of_le h hy <\| hS y hy) fun h => (sInf_of_not_bddBelow h).le #align real.Inf_nonpos Real.sInf_nonpos theorem sInf_le_sSup (s : Set ℝ) (h₁ : BddBelow s) (h₂ : BddAbove s) : sInf s ≤ sSup s := by rcases s.eq_empty_or_nonempty with (rfl \| hne) · rw [sInf_empty, sSup_empty] · exact csInf_le_csSup h₁ h₂ hne #align real.Inf_le_Sup Real.sInf_le_sSup theorem cauSeq_converges (f : CauSeq ℝ abs) : ∃ x, f ≈ const abs x := by let S := { x : ℝ \| const abs x < f } have lb : ∃ x, x ∈ S := exists_lt f have ub' : ∀ x, f < const abs x → ∀ y ∈ S, y ≤ x := fun x h y yS => le_of_lt <\| const_lt.1 <\| CauSeq.lt_trans yS h have ub : ∃ x, ∀ y ∈ S, y ≤ x := (exists_gt f).imp ub' refine ⟨sSup S, ((lt_total _ _).resolve_left fun h => ?_).resolve_right fun h => ?_⟩ · rcases h with ⟨ε, ε0, i, ih⟩ refine (csSup_le lb (ub' _ ?_)).not_lt (sub_lt_self _ (half_pos ε0)) refine ⟨_, half_pos ε0, i, fun j ij => ?_⟩ rw [sub_apply, const_apply, sub_right_comm, le_sub_iff_add_le, add_halves] exact ih _ ij · rcases h with ⟨ε, ε0, i, ih⟩ refine (le_csSup ub ?_).not_lt ((lt_add_iff_pos_left _).2 (half_pos ε0)) refine ⟨_, half_pos ε0, i, fun j ij => ?_⟩ rw [sub_apply, const_apply, add_comm, ← sub_sub, le_sub_iff_add_le, add_halves] exact ih _ ij #align real.cau_seq_converges Real.cauSeq_converges instance : CauSeq.IsComplete ℝ abs := ⟨cauSeq_converges⟩ open Set theorem iInf_Ioi_eq_iInf_rat_gt {f : ℝ → ℝ} (x : ℝ) (hf : BddBelow (f '' Ioi x)) (hf_mono : Monotone f) : ⨅ r : Ioi x, f r = ⨅ q : { q' : ℚ // x < q' }, f q := by refine le_antisymm ?_ ?_ · have : Nonempty { r' : ℚ // x < ↑r' } := by obtain ⟨r, hrx⟩ := exists_rat_gt x exact ⟨⟨r, hrx⟩⟩ refine le_ciInf fun r => ?_ obtain ⟨y, hxy, hyr⟩ := exists_rat_btwn r.prop refine ciInf_set_le hf (hxy.trans ?_) exact_mod_cast hyr · refine le_ciInf fun q => ?_ have hq := q.prop rw [mem_Ioi] at hq obtain ⟨y, hxy, hyq⟩ := exists_rat_btwn hq refine (ciInf_le ?_ ?_).trans ?_ · refine ⟨hf.some, fun z => ?_⟩ rintro ⟨u, rfl⟩ suffices hfu : f u ∈ f '' Ioi x from hf.choose_spec hfu exact ⟨u, u.prop, rfl⟩ · exact ⟨y, hxy⟩ · refine hf_mono (le_trans ?_ hyq.le) norm_cast #align infi_Ioi_eq_infi_rat_gt Real.iInf_Ioi_eq_iInf_rat_gt theorem not_bddAbove_coe : ¬ (BddAbove <\| range (fun (x : ℚ) ↦ (x : ℝ))) := by dsimp only [BddAbove, upperBounds] rw [Set.not_nonempty_iff_eq_empty] ext simpa using exists_rat_gt _ theorem not_bddBelow_coe : ¬ (BddBelow <\| range (fun (x : ℚ) ↦ (x : ℝ))) := by dsimp only [BddBelow, lowerBounds] rw [Set.not_nonempty_iff_eq_empty] ext simpa using exists_rat_lt _ theorem iUnion_Iic_rat : ⋃ r : ℚ, Iic (r : ℝ) = univ := by exact iUnion_Iic_of_not_bddAbove_range not_bddAbove_coe #align real.Union_Iic_rat Real.iUnion_Iic_rat	Mathlib/Data/Real/Archimedean.lean	372	373	theorem iInter_Iic_rat : ⋂ r : ℚ, Iic (r : ℝ) = ∅ := by	exact iInter_Iic_eq_empty_iff.mpr not_bddBelow_coe
import Mathlib.Data.Fintype.Basic import Mathlib.GroupTheory.OrderOfElement import Mathlib.Tactic.Zify import Mathlib.Data.Nat.Totient #align_import number_theory.lucas_primality from "leanprover-community/mathlib"@"70fd9563a21e7b963887c9360bd29b2393e6225a"	Mathlib/NumberTheory/LucasPrimality.lean	42	63	theorem lucas_primality (p : ℕ) (a : ZMod p) (ha : a ^ (p - 1) = 1) (hd : ∀ q : ℕ, q.Prime → q ∣ p - 1 → a ^ ((p - 1) / q) ≠ 1) : p.Prime := by	have h0 : p ≠ 0 := by rintro ⟨⟩ exact hd 2 Nat.prime_two (dvd_zero _) (pow_zero _) have h1 : p ≠ 1 := by rintro ⟨⟩ exact hd 2 Nat.prime_two (dvd_zero _) (pow_zero _) have hp1 : 1 < p := lt_of_le_of_ne h0.bot_lt h1.symm have order_of_a : orderOf a = p - 1 := by apply orderOf_eq_of_pow_and_pow_div_prime _ ha hd exact tsub_pos_of_lt hp1 haveI : NeZero p := ⟨h0⟩ rw [Nat.prime_iff_card_units] -- Prove cardinality of `Units` of `ZMod p` is both `≤ p-1` and `≥ p-1` refine le_antisymm (Nat.card_units_zmod_lt_sub_one hp1) ?_ have hp' : p - 2 + 1 = p - 1 := tsub_add_eq_add_tsub hp1 let a' : (ZMod p)ˣ := Units.mkOfMulEqOne a (a ^ (p - 2)) (by rw [← pow_succ', hp', ha]) calc p - 1 = orderOf a := order_of_a.symm _ = orderOf a' := (orderOf_injective (Units.coeHom (ZMod p)) Units.ext a') _ ≤ Fintype.card (ZMod p)ˣ := orderOf_le_card_univ
import Mathlib.Analysis.Calculus.Deriv.Basic import Mathlib.MeasureTheory.Constructions.BorelSpace.ContinuousLinearMap import Mathlib.MeasureTheory.Covering.BesicovitchVectorSpace import Mathlib.MeasureTheory.Measure.Lebesgue.EqHaar import Mathlib.Analysis.NormedSpace.Pointwise import Mathlib.MeasureTheory.Constructions.Polish import Mathlib.Analysis.Calculus.InverseFunctionTheorem.ApproximatesLinearOn #align_import measure_theory.function.jacobian from "leanprover-community/mathlib"@"b84aee748341da06a6d78491367e2c0e9f15e8a5" open MeasureTheory MeasureTheory.Measure Metric Filter Set FiniteDimensional Asymptotics TopologicalSpace open scoped NNReal ENNReal Topology Pointwise variable {E F : Type} [NormedAddCommGroup E] [NormedSpace ℝ E] [FiniteDimensional ℝ E] [NormedAddCommGroup F] [NormedSpace ℝ F] {s : Set E} {f : E → E} {f' : E → E →L[ℝ] E} theorem exists_closed_cover_approximatesLinearOn_of_hasFDerivWithinAt [SecondCountableTopology F] (f : E → F) (s : Set E) (f' : E → E →L[ℝ] F) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (r : (E →L[ℝ] F) → ℝ≥0) (rpos : ∀ A, r A ≠ 0) : ∃ (t : ℕ → Set E) (A : ℕ → E →L[ℝ] F), (∀ n, IsClosed (t n)) ∧ (s ⊆ ⋃ n, t n) ∧ (∀ n, ApproximatesLinearOn f (A n) (s ∩ t n) (r (A n))) ∧ (s.Nonempty → ∀ n, ∃ y ∈ s, A n = f' y) := by -- exclude the trivial case where `s` is empty rcases eq_empty_or_nonempty s with (rfl \| hs) · refine ⟨fun _ => ∅, fun _ => 0, ?_, ?_, ?_, ?_⟩ <;> simp -- we will use countably many linear maps. Select these from all the derivatives since the -- space of linear maps is second-countable obtain ⟨T, T_count, hT⟩ : ∃ T : Set s, T.Countable ∧ ⋃ x ∈ T, ball (f' (x : E)) (r (f' x)) = ⋃ x : s, ball (f' x) (r (f' x)) := TopologicalSpace.isOpen_iUnion_countable _ fun x => isOpen_ball -- fix a sequence `u` of positive reals tending to zero. obtain ⟨u, _, u_pos, u_lim⟩ : ∃ u : ℕ → ℝ, StrictAnti u ∧ (∀ n : ℕ, 0 < u n) ∧ Tendsto u atTop (𝓝 0) := exists_seq_strictAnti_tendsto (0 : ℝ) -- `M n z` is the set of points `x` such that `f y - f x` is close to `f' z (y - x)` for `y` -- in the ball of radius `u n` around `x`. let M : ℕ → T → Set E := fun n z => {x \| x ∈ s ∧ ∀ y ∈ s ∩ ball x (u n), ‖f y - f x - f' z (y - x)‖ ≤ r (f' z) ‖y - x‖} -- As `f` is differentiable everywhere on `s`, the sets `M n z` cover `s` by design. have s_subset : ∀ x ∈ s, ∃ (n : ℕ) (z : T), x ∈ M n z := by intro x xs obtain ⟨z, zT, hz⟩ : ∃ z ∈ T, f' x ∈ ball (f' (z : E)) (r (f' z)) := by have : f' x ∈ ⋃ z ∈ T, ball (f' (z : E)) (r (f' z)) := by rw [hT] refine mem_iUnion.2 ⟨⟨x, xs⟩, ?_⟩ simpa only [mem_ball, Subtype.coe_mk, dist_self] using (rpos (f' x)).bot_lt rwa [mem_iUnion₂, bex_def] at this obtain ⟨ε, εpos, hε⟩ : ∃ ε : ℝ, 0 < ε ∧ ‖f' x - f' z‖ + ε ≤ r (f' z) := by refine ⟨r (f' z) - ‖f' x - f' z‖, ?_, le_of_eq (by abel)⟩ simpa only [sub_pos] using mem_ball_iff_norm.mp hz obtain ⟨δ, δpos, hδ⟩ : ∃ (δ : ℝ), 0 < δ ∧ ball x δ ∩ s ⊆ {y \| ‖f y - f x - (f' x) (y - x)‖ ≤ ε * ‖y - x‖} := Metric.mem_nhdsWithin_iff.1 ((hf' x xs).isLittleO.def εpos) obtain ⟨n, hn⟩ : ∃ n, u n < δ := ((tendsto_order.1 u_lim).2 _ δpos).exists refine ⟨n, ⟨z, zT⟩, ⟨xs, ?_⟩⟩ intro y hy calc ‖f y - f x - (f' z) (y - x)‖ = ‖f y - f x - (f' x) (y - x) + (f' x - f' z) (y - x)‖ := by congr 1 simp only [ContinuousLinearMap.coe_sub', map_sub, Pi.sub_apply] abel _ ≤ ‖f y - f x - (f' x) (y - x)‖ + ‖(f' x - f' z) (y - x)‖ := norm_add_le _ _ _ ≤ ε * ‖y - x‖ + ‖f' x - f' z‖ * ‖y - x‖ := by refine add_le_add (hδ ?_) (ContinuousLinearMap.le_opNorm _ _) rw [inter_comm] exact inter_subset_inter_right _ (ball_subset_ball hn.le) hy _ ≤ r (f' z) * ‖y - x‖ := by rw [← add_mul, add_comm] gcongr -- the sets `M n z` are relatively closed in `s`, as all the conditions defining it are clearly -- closed have closure_M_subset : ∀ n z, s ∩ closure (M n z) ⊆ M n z := by rintro n z x ⟨xs, hx⟩ refine ⟨xs, fun y hy => ?_⟩ obtain ⟨a, aM, a_lim⟩ : ∃ a : ℕ → E, (∀ k, a k ∈ M n z) ∧ Tendsto a atTop (𝓝 x) := mem_closure_iff_seq_limit.1 hx have L1 : Tendsto (fun k : ℕ => ‖f y - f (a k) - (f' z) (y - a k)‖) atTop (𝓝 ‖f y - f x - (f' z) (y - x)‖) := by apply Tendsto.norm have L : Tendsto (fun k => f (a k)) atTop (𝓝 (f x)) := by apply (hf' x xs).continuousWithinAt.tendsto.comp apply tendsto_nhdsWithin_of_tendsto_nhds_of_eventually_within _ a_lim exact eventually_of_forall fun k => (aM k).1 apply Tendsto.sub (tendsto_const_nhds.sub L) exact ((f' z).continuous.tendsto _).comp (tendsto_const_nhds.sub a_lim) have L2 : Tendsto (fun k : ℕ => (r (f' z) : ℝ) * ‖y - a k‖) atTop (𝓝 (r (f' z) * ‖y - x‖)) := (tendsto_const_nhds.sub a_lim).norm.const_mul _ have I : ∀ᶠ k in atTop, ‖f y - f (a k) - (f' z) (y - a k)‖ ≤ r (f' z) * ‖y - a k‖ := by have L : Tendsto (fun k => dist y (a k)) atTop (𝓝 (dist y x)) := tendsto_const_nhds.dist a_lim filter_upwards [(tendsto_order.1 L).2 _ hy.2] intro k hk exact (aM k).2 y ⟨hy.1, hk⟩ exact le_of_tendsto_of_tendsto L1 L2 I -- choose a dense sequence `d p` rcases TopologicalSpace.exists_dense_seq E with ⟨d, hd⟩ -- split `M n z` into subsets `K n z p` of small diameters by intersecting with the ball -- `closedBall (d p) (u n / 3)`. let K : ℕ → T → ℕ → Set E := fun n z p => closure (M n z) ∩ closedBall (d p) (u n / 3) -- on the sets `K n z p`, the map `f` is well approximated by `f' z` by design. have K_approx : ∀ (n) (z : T) (p), ApproximatesLinearOn f (f' z) (s ∩ K n z p) (r (f' z)) := by intro n z p x hx y hy have yM : y ∈ M n z := closure_M_subset _ _ ⟨hy.1, hy.2.1⟩ refine yM.2 _ ⟨hx.1, ?_⟩ calc dist x y ≤ dist x (d p) + dist y (d p) := dist_triangle_right _ _ _ _ ≤ u n / 3 + u n / 3 := add_le_add hx.2.2 hy.2.2 _ < u n := by linarith [u_pos n] -- the sets `K n z p` are also closed, again by design. have K_closed : ∀ (n) (z : T) (p), IsClosed (K n z p) := fun n z p => isClosed_closure.inter isClosed_ball -- reindex the sets `K n z p`, to let them only depend on an integer parameter `q`. obtain ⟨F, hF⟩ : ∃ F : ℕ → ℕ × T × ℕ, Function.Surjective F := by haveI : Encodable T := T_count.toEncodable have : Nonempty T := by rcases hs with ⟨x, xs⟩ rcases s_subset x xs with ⟨n, z, _⟩ exact ⟨z⟩ inhabit ↥T exact ⟨_, Encodable.surjective_decode_iget (ℕ × T × ℕ)⟩ -- these sets `t q = K n z p` will do refine ⟨fun q => K (F q).1 (F q).2.1 (F q).2.2, fun q => f' (F q).2.1, fun n => K_closed _ _ _, fun x xs => ?_, fun q => K_approx _ _ _, fun _ q => ⟨(F q).2.1, (F q).2.1.1.2, rfl⟩⟩ -- the only fact that needs further checking is that they cover `s`. -- we already know that any point `x ∈ s` belongs to a set `M n z`. obtain ⟨n, z, hnz⟩ : ∃ (n : ℕ) (z : T), x ∈ M n z := s_subset x xs -- by density, it also belongs to a ball `closedBall (d p) (u n / 3)`. obtain ⟨p, hp⟩ : ∃ p : ℕ, x ∈ closedBall (d p) (u n / 3) := by have : Set.Nonempty (ball x (u n / 3)) := by simp only [nonempty_ball]; linarith [u_pos n] obtain ⟨p, hp⟩ : ∃ p : ℕ, d p ∈ ball x (u n / 3) := hd.exists_mem_open isOpen_ball this exact ⟨p, (mem_ball'.1 hp).le⟩ -- choose `q` for which `t q = K n z p`. obtain ⟨q, hq⟩ : ∃ q, F q = (n, z, p) := hF _ -- then `x` belongs to `t q`. apply mem_iUnion.2 ⟨q, _⟩ simp (config := { zeta := false }) only [K, hq, mem_inter_iff, hp, and_true] exact subset_closure hnz #align exists_closed_cover_approximates_linear_on_of_has_fderiv_within_at exists_closed_cover_approximatesLinearOn_of_hasFDerivWithinAt variable [MeasurableSpace E] [BorelSpace E] (μ : Measure E) [IsAddHaarMeasure μ] theorem exists_partition_approximatesLinearOn_of_hasFDerivWithinAt [SecondCountableTopology F] (f : E → F) (s : Set E) (f' : E → E →L[ℝ] F) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (r : (E →L[ℝ] F) → ℝ≥0) (rpos : ∀ A, r A ≠ 0) : ∃ (t : ℕ → Set E) (A : ℕ → E →L[ℝ] F), Pairwise (Disjoint on t) ∧ (∀ n, MeasurableSet (t n)) ∧ (s ⊆ ⋃ n, t n) ∧ (∀ n, ApproximatesLinearOn f (A n) (s ∩ t n) (r (A n))) ∧ (s.Nonempty → ∀ n, ∃ y ∈ s, A n = f' y) := by rcases exists_closed_cover_approximatesLinearOn_of_hasFDerivWithinAt f s f' hf' r rpos with ⟨t, A, t_closed, st, t_approx, ht⟩ refine ⟨disjointed t, A, disjoint_disjointed _, MeasurableSet.disjointed fun n => (t_closed n).measurableSet, ?_, ?_, ht⟩ · rw [iUnion_disjointed]; exact st · intro n; exact (t_approx n).mono_set (inter_subset_inter_right _ (disjointed_subset _ _)) #align exists_partition_approximates_linear_on_of_has_fderiv_within_at exists_partition_approximatesLinearOn_of_hasFDerivWithinAt namespace MeasureTheory theorem addHaar_image_le_mul_of_det_lt (A : E →L[ℝ] E) {m : ℝ≥0} (hm : ENNReal.ofReal \|A.det\| < m) : ∀ᶠ δ in 𝓝[>] (0 : ℝ≥0), ∀ (s : Set E) (f : E → E), ApproximatesLinearOn f A s δ → μ (f '' s) ≤ m * μ s := by apply nhdsWithin_le_nhds let d := ENNReal.ofReal \|A.det\| -- construct a small neighborhood of `A '' (closedBall 0 1)` with measure comparable to -- the determinant of `A`. obtain ⟨ε, hε, εpos⟩ : ∃ ε : ℝ, μ (closedBall 0 ε + A '' closedBall 0 1) < m * μ (closedBall 0 1) ∧ 0 < ε := by have HC : IsCompact (A '' closedBall 0 1) := (ProperSpace.isCompact_closedBall _ _).image A.continuous have L0 : Tendsto (fun ε => μ (cthickening ε (A '' closedBall 0 1))) (𝓝[>] 0) (𝓝 (μ (A '' closedBall 0 1))) := by apply Tendsto.mono_left _ nhdsWithin_le_nhds exact tendsto_measure_cthickening_of_isCompact HC have L1 : Tendsto (fun ε => μ (closedBall 0 ε + A '' closedBall 0 1)) (𝓝[>] 0) (𝓝 (μ (A '' closedBall 0 1))) := by apply L0.congr' _ filter_upwards [self_mem_nhdsWithin] with r hr rw [← HC.add_closedBall_zero (le_of_lt hr), add_comm] have L2 : Tendsto (fun ε => μ (closedBall 0 ε + A '' closedBall 0 1)) (𝓝[>] 0) (𝓝 (d * μ (closedBall 0 1))) := by convert L1 exact (addHaar_image_continuousLinearMap _ _ _).symm have I : d * μ (closedBall 0 1) < m * μ (closedBall 0 1) := (ENNReal.mul_lt_mul_right (measure_closedBall_pos μ _ zero_lt_one).ne' measure_closedBall_lt_top.ne).2 hm have H : ∀ᶠ b : ℝ in 𝓝[>] 0, μ (closedBall 0 b + A '' closedBall 0 1) < m * μ (closedBall 0 1) := (tendsto_order.1 L2).2 _ I exact (H.and self_mem_nhdsWithin).exists have : Iio (⟨ε, εpos.le⟩ : ℝ≥0) ∈ 𝓝 (0 : ℝ≥0) := by apply Iio_mem_nhds; exact εpos filter_upwards [this] -- fix a function `f` which is close enough to `A`. intro δ hδ s f hf simp only [mem_Iio, ← NNReal.coe_lt_coe, NNReal.coe_mk] at hδ -- This function expands the volume of any ball by at most `m` have I : ∀ x r, x ∈ s → 0 ≤ r → μ (f '' (s ∩ closedBall x r)) ≤ m * μ (closedBall x r) := by intro x r xs r0 have K : f '' (s ∩ closedBall x r) ⊆ A '' closedBall 0 r + closedBall (f x) (ε * r) := by rintro y ⟨z, ⟨zs, zr⟩, rfl⟩ rw [mem_closedBall_iff_norm] at zr apply Set.mem_add.2 ⟨A (z - x), _, f z - f x - A (z - x) + f x, _, _⟩ · apply mem_image_of_mem simpa only [dist_eq_norm, mem_closedBall, mem_closedBall_zero_iff, sub_zero] using zr · rw [mem_closedBall_iff_norm, add_sub_cancel_right] calc ‖f z - f x - A (z - x)‖ ≤ δ * ‖z - x‖ := hf _ zs _ xs _ ≤ ε * r := by gcongr · simp only [map_sub, Pi.sub_apply] abel have : A '' closedBall 0 r + closedBall (f x) (ε * r) = {f x} + r • (A '' closedBall 0 1 + closedBall 0 ε) := by rw [smul_add, ← add_assoc, add_comm {f x}, add_assoc, smul_closedBall _ _ εpos.le, smul_zero, singleton_add_closedBall_zero, ← image_smul_set ℝ E E A, smul_closedBall _ _ zero_le_one, smul_zero, Real.norm_eq_abs, abs_of_nonneg r0, mul_one, mul_comm] rw [this] at K calc μ (f '' (s ∩ closedBall x r)) ≤ μ ({f x} + r • (A '' closedBall 0 1 + closedBall 0 ε)) := measure_mono K _ = ENNReal.ofReal (r ^ finrank ℝ E) * μ (A '' closedBall 0 1 + closedBall 0 ε) := by simp only [abs_of_nonneg r0, addHaar_smul, image_add_left, abs_pow, singleton_add, measure_preimage_add] _ ≤ ENNReal.ofReal (r ^ finrank ℝ E) * (m * μ (closedBall 0 1)) := by rw [add_comm]; gcongr _ = m * μ (closedBall x r) := by simp only [addHaar_closedBall' μ _ r0]; ring -- covering `s` by closed balls with total measure very close to `μ s`, one deduces that the -- measure of `f '' s` is at most `m * (μ s + a)` for any positive `a`. have J : ∀ᶠ a in 𝓝[>] (0 : ℝ≥0∞), μ (f '' s) ≤ m * (μ s + a) := by filter_upwards [self_mem_nhdsWithin] with a ha rw [mem_Ioi] at ha obtain ⟨t, r, t_count, ts, rpos, st, μt⟩ : ∃ (t : Set E) (r : E → ℝ), t.Countable ∧ t ⊆ s ∧ (∀ x : E, x ∈ t → 0 < r x) ∧ (s ⊆ ⋃ x ∈ t, closedBall x (r x)) ∧ (∑' x : ↥t, μ (closedBall (↑x) (r ↑x))) ≤ μ s + a := Besicovitch.exists_closedBall_covering_tsum_measure_le μ ha.ne' (fun _ => Ioi 0) s fun x _ δ δpos => ⟨δ / 2, by simp [half_pos δpos, δpos]⟩ haveI : Encodable t := t_count.toEncodable calc μ (f '' s) ≤ μ (⋃ x : t, f '' (s ∩ closedBall x (r x))) := by rw [biUnion_eq_iUnion] at st apply measure_mono rw [← image_iUnion, ← inter_iUnion] exact image_subset _ (subset_inter (Subset.refl _) st) _ ≤ ∑' x : t, μ (f '' (s ∩ closedBall x (r x))) := measure_iUnion_le _ _ ≤ ∑' x : t, m * μ (closedBall x (r x)) := (ENNReal.tsum_le_tsum fun x => I x (r x) (ts x.2) (rpos x x.2).le) _ ≤ m * (μ s + a) := by rw [ENNReal.tsum_mul_left]; gcongr -- taking the limit in `a`, one obtains the conclusion have L : Tendsto (fun a => (m : ℝ≥0∞) * (μ s + a)) (𝓝[>] 0) (𝓝 (m * (μ s + 0))) := by apply Tendsto.mono_left _ nhdsWithin_le_nhds apply ENNReal.Tendsto.const_mul (tendsto_const_nhds.add tendsto_id) simp only [ENNReal.coe_ne_top, Ne, or_true_iff, not_false_iff] rw [add_zero] at L exact ge_of_tendsto L J #align measure_theory.add_haar_image_le_mul_of_det_lt MeasureTheory.addHaar_image_le_mul_of_det_lt theorem mul_le_addHaar_image_of_lt_det (A : E →L[ℝ] E) {m : ℝ≥0} (hm : (m : ℝ≥0∞) < ENNReal.ofReal \|A.det\|) : ∀ᶠ δ in 𝓝[>] (0 : ℝ≥0), ∀ (s : Set E) (f : E → E), ApproximatesLinearOn f A s δ → (m : ℝ≥0∞) * μ s ≤ μ (f '' s) := by apply nhdsWithin_le_nhds -- The assumption `hm` implies that `A` is invertible. If `f` is close enough to `A`, it is also -- invertible. One can then pass to the inverses, and deduce the estimate from -- `addHaar_image_le_mul_of_det_lt` applied to `f⁻¹` and `A⁻¹`. -- exclude first the trivial case where `m = 0`. rcases eq_or_lt_of_le (zero_le m) with (rfl \| mpos) · filter_upwards simp only [forall_const, zero_mul, imp_true_iff, zero_le, ENNReal.coe_zero] have hA : A.det ≠ 0 := by intro h; simp only [h, ENNReal.not_lt_zero, ENNReal.ofReal_zero, abs_zero] at hm -- let `B` be the continuous linear equiv version of `A`. let B := A.toContinuousLinearEquivOfDetNeZero hA -- the determinant of `B.symm` is bounded by `m⁻¹` have I : ENNReal.ofReal \|(B.symm : E →L[ℝ] E).det\| < (m⁻¹ : ℝ≥0) := by simp only [ENNReal.ofReal, abs_inv, Real.toNNReal_inv, ContinuousLinearEquiv.det_coe_symm, ContinuousLinearMap.coe_toContinuousLinearEquivOfDetNeZero, ENNReal.coe_lt_coe] at hm ⊢ exact NNReal.inv_lt_inv mpos.ne' hm -- therefore, we may apply `addHaar_image_le_mul_of_det_lt` to `B.symm` and `m⁻¹`. obtain ⟨δ₀, δ₀pos, hδ₀⟩ : ∃ δ : ℝ≥0, 0 < δ ∧ ∀ (t : Set E) (g : E → E), ApproximatesLinearOn g (B.symm : E →L[ℝ] E) t δ → μ (g '' t) ≤ ↑m⁻¹ * μ t := by have : ∀ᶠ δ : ℝ≥0 in 𝓝[>] 0, ∀ (t : Set E) (g : E → E), ApproximatesLinearOn g (B.symm : E →L[ℝ] E) t δ → μ (g '' t) ≤ ↑m⁻¹ * μ t := addHaar_image_le_mul_of_det_lt μ B.symm I rcases (this.and self_mem_nhdsWithin).exists with ⟨δ₀, h, h'⟩ exact ⟨δ₀, h', h⟩ -- record smallness conditions for `δ` that will be needed to apply `hδ₀` below. have L1 : ∀ᶠ δ in 𝓝 (0 : ℝ≥0), Subsingleton E ∨ δ < ‖(B.symm : E →L[ℝ] E)‖₊⁻¹ := by by_cases h : Subsingleton E · simp only [h, true_or_iff, eventually_const] simp only [h, false_or_iff] apply Iio_mem_nhds simpa only [h, false_or_iff, inv_pos] using B.subsingleton_or_nnnorm_symm_pos have L2 : ∀ᶠ δ in 𝓝 (0 : ℝ≥0), ‖(B.symm : E →L[ℝ] E)‖₊ * (‖(B.symm : E →L[ℝ] E)‖₊⁻¹ - δ)⁻¹ * δ < δ₀ := by have : Tendsto (fun δ => ‖(B.symm : E →L[ℝ] E)‖₊ * (‖(B.symm : E →L[ℝ] E)‖₊⁻¹ - δ)⁻¹ * δ) (𝓝 0) (𝓝 (‖(B.symm : E →L[ℝ] E)‖₊ * (‖(B.symm : E →L[ℝ] E)‖₊⁻¹ - 0)⁻¹ * 0)) := by rcases eq_or_ne ‖(B.symm : E →L[ℝ] E)‖₊ 0 with (H \| H) · simpa only [H, zero_mul] using tendsto_const_nhds refine Tendsto.mul (tendsto_const_nhds.mul ?_) tendsto_id refine (Tendsto.sub tendsto_const_nhds tendsto_id).inv₀ ?_ simpa only [tsub_zero, inv_eq_zero, Ne] using H simp only [mul_zero] at this exact (tendsto_order.1 this).2 δ₀ δ₀pos -- let `δ` be small enough, and `f` approximated by `B` up to `δ`. filter_upwards [L1, L2] intro δ h1δ h2δ s f hf have hf' : ApproximatesLinearOn f (B : E →L[ℝ] E) s δ := by convert hf let F := hf'.toPartialEquiv h1δ -- the condition to be checked can be reformulated in terms of the inverse maps suffices H : μ (F.symm '' F.target) ≤ (m⁻¹ : ℝ≥0) * μ F.target by change (m : ℝ≥0∞) * μ F.source ≤ μ F.target rwa [← F.symm_image_target_eq_source, mul_comm, ← ENNReal.le_div_iff_mul_le, div_eq_mul_inv, mul_comm, ← ENNReal.coe_inv mpos.ne'] · apply Or.inl simpa only [ENNReal.coe_eq_zero, Ne] using mpos.ne' · simp only [ENNReal.coe_ne_top, true_or_iff, Ne, not_false_iff] -- as `f⁻¹` is well approximated by `B⁻¹`, the conclusion follows from `hδ₀` -- and our choice of `δ`. exact hδ₀ _ _ ((hf'.to_inv h1δ).mono_num h2δ.le) #align measure_theory.mul_le_add_haar_image_of_lt_det MeasureTheory.mul_le_addHaar_image_of_lt_det theorem _root_.ApproximatesLinearOn.norm_fderiv_sub_le {A : E →L[ℝ] E} {δ : ℝ≥0} (hf : ApproximatesLinearOn f A s δ) (hs : MeasurableSet s) (f' : E → E →L[ℝ] E) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) : ∀ᵐ x ∂μ.restrict s, ‖f' x - A‖₊ ≤ δ := by filter_upwards [Besicovitch.ae_tendsto_measure_inter_div μ s, ae_restrict_mem hs] -- start from a Lebesgue density point `x`, belonging to `s`. intro x hx xs -- consider an arbitrary vector `z`. apply ContinuousLinearMap.opNorm_le_bound _ δ.2 fun z => ?_ -- to show that `‖(f' x - A) z‖ ≤ δ ‖z‖`, it suffices to do it up to some error that vanishes -- asymptotically in terms of `ε > 0`. suffices H : ∀ ε, 0 < ε → ‖(f' x - A) z‖ ≤ (δ + ε) * (‖z‖ + ε) + ‖f' x - A‖ * ε by have : Tendsto (fun ε : ℝ => ((δ : ℝ) + ε) * (‖z‖ + ε) + ‖f' x - A‖ * ε) (𝓝[>] 0) (𝓝 ((δ + 0) * (‖z‖ + 0) + ‖f' x - A‖ * 0)) := Tendsto.mono_left (Continuous.tendsto (by continuity) 0) nhdsWithin_le_nhds simp only [add_zero, mul_zero] at this apply le_of_tendsto_of_tendsto tendsto_const_nhds this filter_upwards [self_mem_nhdsWithin] exact H -- fix a positive `ε`. intro ε εpos -- for small enough `r`, the rescaled ball `r • closedBall z ε` intersects `s`, as `x` is a -- density point have B₁ : ∀ᶠ r in 𝓝[>] (0 : ℝ), (s ∩ ({x} + r • closedBall z ε)).Nonempty := eventually_nonempty_inter_smul_of_density_one μ s x hx _ measurableSet_closedBall (measure_closedBall_pos μ z εpos).ne' obtain ⟨ρ, ρpos, hρ⟩ : ∃ ρ > 0, ball x ρ ∩ s ⊆ {y : E \| ‖f y - f x - (f' x) (y - x)‖ ≤ ε * ‖y - x‖} := mem_nhdsWithin_iff.1 ((hf' x xs).isLittleO.def εpos) -- for small enough `r`, the rescaled ball `r • closedBall z ε` is included in the set where -- `f y - f x` is well approximated by `f' x (y - x)`. have B₂ : ∀ᶠ r in 𝓝[>] (0 : ℝ), {x} + r • closedBall z ε ⊆ ball x ρ := by apply nhdsWithin_le_nhds exact eventually_singleton_add_smul_subset isBounded_closedBall (ball_mem_nhds x ρpos) -- fix a small positive `r` satisfying the above properties, as well as a corresponding `y`. obtain ⟨r, ⟨y, ⟨ys, hy⟩⟩, rρ, rpos⟩ : ∃ r : ℝ, (s ∩ ({x} + r • closedBall z ε)).Nonempty ∧ {x} + r • closedBall z ε ⊆ ball x ρ ∧ 0 < r := (B₁.and (B₂.and self_mem_nhdsWithin)).exists -- write `y = x + r a` with `a ∈ closedBall z ε`. obtain ⟨a, az, ya⟩ : ∃ a, a ∈ closedBall z ε ∧ y = x + r • a := by simp only [mem_smul_set, image_add_left, mem_preimage, singleton_add] at hy rcases hy with ⟨a, az, ha⟩ exact ⟨a, az, by simp only [ha, add_neg_cancel_left]⟩ have norm_a : ‖a‖ ≤ ‖z‖ + ε := calc ‖a‖ = ‖z + (a - z)‖ := by simp only [add_sub_cancel] _ ≤ ‖z‖ + ‖a - z‖ := norm_add_le _ _ _ ≤ ‖z‖ + ε := add_le_add_left (mem_closedBall_iff_norm.1 az) _ -- use the approximation properties to control `(f' x - A) a`, and then `(f' x - A) z` as `z` is -- close to `a`. have I : r * ‖(f' x - A) a‖ ≤ r * (δ + ε) * (‖z‖ + ε) := calc r * ‖(f' x - A) a‖ = ‖(f' x - A) (r • a)‖ := by simp only [ContinuousLinearMap.map_smul, norm_smul, Real.norm_eq_abs, abs_of_nonneg rpos.le] _ = ‖f y - f x - A (y - x) - (f y - f x - (f' x) (y - x))‖ := by congr 1 simp only [ya, add_sub_cancel_left, sub_sub_sub_cancel_left, ContinuousLinearMap.coe_sub', eq_self_iff_true, sub_left_inj, Pi.sub_apply, ContinuousLinearMap.map_smul, smul_sub] _ ≤ ‖f y - f x - A (y - x)‖ + ‖f y - f x - (f' x) (y - x)‖ := norm_sub_le _ _ _ ≤ δ * ‖y - x‖ + ε * ‖y - x‖ := (add_le_add (hf _ ys _ xs) (hρ ⟨rρ hy, ys⟩)) _ = r * (δ + ε) * ‖a‖ := by simp only [ya, add_sub_cancel_left, norm_smul, Real.norm_eq_abs, abs_of_nonneg rpos.le] ring _ ≤ r * (δ + ε) * (‖z‖ + ε) := by gcongr calc ‖(f' x - A) z‖ = ‖(f' x - A) a + (f' x - A) (z - a)‖ := by congr 1 simp only [ContinuousLinearMap.coe_sub', map_sub, Pi.sub_apply] abel _ ≤ ‖(f' x - A) a‖ + ‖(f' x - A) (z - a)‖ := norm_add_le _ _ _ ≤ (δ + ε) * (‖z‖ + ε) + ‖f' x - A‖ * ‖z - a‖ := by apply add_le_add · rw [mul_assoc] at I; exact (mul_le_mul_left rpos).1 I · apply ContinuousLinearMap.le_opNorm _ ≤ (δ + ε) * (‖z‖ + ε) + ‖f' x - A‖ * ε := by rw [mem_closedBall_iff_norm'] at az gcongr #align approximates_linear_on.norm_fderiv_sub_le ApproximatesLinearOn.norm_fderiv_sub_le theorem addHaar_image_eq_zero_of_differentiableOn_of_addHaar_eq_zero (hf : DifferentiableOn ℝ f s) (hs : μ s = 0) : μ (f '' s) = 0 := by refine le_antisymm ?_ (zero_le _) have : ∀ A : E →L[ℝ] E, ∃ δ : ℝ≥0, 0 < δ ∧ ∀ (t : Set E), ApproximatesLinearOn f A t δ → μ (f '' t) ≤ (Real.toNNReal \|A.det\| + 1 : ℝ≥0) * μ t := by intro A let m : ℝ≥0 := Real.toNNReal \|A.det\| + 1 have I : ENNReal.ofReal \|A.det\| < m := by simp only [m, ENNReal.ofReal, lt_add_iff_pos_right, zero_lt_one, ENNReal.coe_lt_coe] rcases ((addHaar_image_le_mul_of_det_lt μ A I).and self_mem_nhdsWithin).exists with ⟨δ, h, h'⟩ exact ⟨δ, h', fun t ht => h t f ht⟩ choose δ hδ using this obtain ⟨t, A, _, _, t_cover, ht, -⟩ : ∃ (t : ℕ → Set E) (A : ℕ → E →L[ℝ] E), Pairwise (Disjoint on t) ∧ (∀ n : ℕ, MeasurableSet (t n)) ∧ (s ⊆ ⋃ n : ℕ, t n) ∧ (∀ n : ℕ, ApproximatesLinearOn f (A n) (s ∩ t n) (δ (A n))) ∧ (s.Nonempty → ∀ n, ∃ y ∈ s, A n = fderivWithin ℝ f s y) := exists_partition_approximatesLinearOn_of_hasFDerivWithinAt f s (fderivWithin ℝ f s) (fun x xs => (hf x xs).hasFDerivWithinAt) δ fun A => (hδ A).1.ne' calc μ (f '' s) ≤ μ (⋃ n, f '' (s ∩ t n)) := by apply measure_mono rw [← image_iUnion, ← inter_iUnion] exact image_subset f (subset_inter Subset.rfl t_cover) _ ≤ ∑' n, μ (f '' (s ∩ t n)) := measure_iUnion_le _ _ ≤ ∑' n, (Real.toNNReal \|(A n).det\| + 1 : ℝ≥0) * μ (s ∩ t n) := by apply ENNReal.tsum_le_tsum fun n => ?_ apply (hδ (A n)).2 exact ht n _ ≤ ∑' n, ((Real.toNNReal \|(A n).det\| + 1 : ℝ≥0) : ℝ≥0∞) * 0 := by refine ENNReal.tsum_le_tsum fun n => mul_le_mul_left' ?_ _ exact le_trans (measure_mono inter_subset_left) (le_of_eq hs) _ = 0 := by simp only [tsum_zero, mul_zero] #align measure_theory.add_haar_image_eq_zero_of_differentiable_on_of_add_haar_eq_zero MeasureTheory.addHaar_image_eq_zero_of_differentiableOn_of_addHaar_eq_zero theorem addHaar_image_eq_zero_of_det_fderivWithin_eq_zero_aux (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (R : ℝ) (hs : s ⊆ closedBall 0 R) (ε : ℝ≥0) (εpos : 0 < ε) (h'f' : ∀ x ∈ s, (f' x).det = 0) : μ (f '' s) ≤ ε * μ (closedBall 0 R) := by rcases eq_empty_or_nonempty s with (rfl \| h's); · simp only [measure_empty, zero_le, image_empty] have : ∀ A : E →L[ℝ] E, ∃ δ : ℝ≥0, 0 < δ ∧ ∀ (t : Set E), ApproximatesLinearOn f A t δ → μ (f '' t) ≤ (Real.toNNReal \|A.det\| + ε : ℝ≥0) * μ t := by intro A let m : ℝ≥0 := Real.toNNReal \|A.det\| + ε have I : ENNReal.ofReal \|A.det\| < m := by simp only [m, ENNReal.ofReal, lt_add_iff_pos_right, εpos, ENNReal.coe_lt_coe] rcases ((addHaar_image_le_mul_of_det_lt μ A I).and self_mem_nhdsWithin).exists with ⟨δ, h, h'⟩ exact ⟨δ, h', fun t ht => h t f ht⟩ choose δ hδ using this obtain ⟨t, A, t_disj, t_meas, t_cover, ht, Af'⟩ : ∃ (t : ℕ → Set E) (A : ℕ → E →L[ℝ] E), Pairwise (Disjoint on t) ∧ (∀ n : ℕ, MeasurableSet (t n)) ∧ (s ⊆ ⋃ n : ℕ, t n) ∧ (∀ n : ℕ, ApproximatesLinearOn f (A n) (s ∩ t n) (δ (A n))) ∧ (s.Nonempty → ∀ n, ∃ y ∈ s, A n = f' y) := exists_partition_approximatesLinearOn_of_hasFDerivWithinAt f s f' hf' δ fun A => (hδ A).1.ne' calc μ (f '' s) ≤ μ (⋃ n, f '' (s ∩ t n)) := by rw [← image_iUnion, ← inter_iUnion] gcongr exact subset_inter Subset.rfl t_cover _ ≤ ∑' n, μ (f '' (s ∩ t n)) := measure_iUnion_le _ _ ≤ ∑' n, (Real.toNNReal \|(A n).det\| + ε : ℝ≥0) * μ (s ∩ t n) := by gcongr exact (hδ (A _)).2 _ (ht _) _ = ∑' n, ε * μ (s ∩ t n) := by congr with n rcases Af' h's n with ⟨y, ys, hy⟩ simp only [hy, h'f' y ys, Real.toNNReal_zero, abs_zero, zero_add] _ ≤ ε * ∑' n, μ (closedBall 0 R ∩ t n) := by rw [ENNReal.tsum_mul_left] gcongr _ = ε * μ (⋃ n, closedBall 0 R ∩ t n) := by rw [measure_iUnion] · exact pairwise_disjoint_mono t_disj fun n => inter_subset_right · intro n exact measurableSet_closedBall.inter (t_meas n) _ ≤ ε * μ (closedBall 0 R) := by rw [← inter_iUnion] exact mul_le_mul_left' (measure_mono inter_subset_left) _ #align measure_theory.add_haar_image_eq_zero_of_det_fderiv_within_eq_zero_aux MeasureTheory.addHaar_image_eq_zero_of_det_fderivWithin_eq_zero_aux theorem addHaar_image_eq_zero_of_det_fderivWithin_eq_zero (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (h'f' : ∀ x ∈ s, (f' x).det = 0) : μ (f '' s) = 0 := by suffices H : ∀ R, μ (f '' (s ∩ closedBall 0 R)) = 0 by apply le_antisymm _ (zero_le _) rw [← iUnion_inter_closedBall_nat s 0] calc μ (f '' ⋃ n : ℕ, s ∩ closedBall 0 n) ≤ ∑' n : ℕ, μ (f '' (s ∩ closedBall 0 n)) := by rw [image_iUnion]; exact measure_iUnion_le _ _ ≤ 0 := by simp only [H, tsum_zero, nonpos_iff_eq_zero] intro R have A : ∀ (ε : ℝ≥0), 0 < ε → μ (f '' (s ∩ closedBall 0 R)) ≤ ε * μ (closedBall 0 R) := fun ε εpos => addHaar_image_eq_zero_of_det_fderivWithin_eq_zero_aux μ (fun x hx => (hf' x hx.1).mono inter_subset_left) R inter_subset_right ε εpos fun x hx => h'f' x hx.1 have B : Tendsto (fun ε : ℝ≥0 => (ε : ℝ≥0∞) * μ (closedBall 0 R)) (𝓝[>] 0) (𝓝 0) := by have : Tendsto (fun ε : ℝ≥0 => (ε : ℝ≥0∞) * μ (closedBall 0 R)) (𝓝 0) (𝓝 (((0 : ℝ≥0) : ℝ≥0∞) * μ (closedBall 0 R))) := ENNReal.Tendsto.mul_const (ENNReal.tendsto_coe.2 tendsto_id) (Or.inr measure_closedBall_lt_top.ne) simp only [zero_mul, ENNReal.coe_zero] at this exact Tendsto.mono_left this nhdsWithin_le_nhds apply le_antisymm _ (zero_le _) apply ge_of_tendsto B filter_upwards [self_mem_nhdsWithin] exact A #align measure_theory.add_haar_image_eq_zero_of_det_fderiv_within_eq_zero MeasureTheory.addHaar_image_eq_zero_of_det_fderivWithin_eq_zero theorem aemeasurable_fderivWithin (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) : AEMeasurable f' (μ.restrict s) := by -- fix a precision `ε` refine aemeasurable_of_unif_approx fun ε εpos => ?_ let δ : ℝ≥0 := ⟨ε, le_of_lt εpos⟩ have δpos : 0 < δ := εpos -- partition `s` into sets `s ∩ t n` on which `f` is approximated by linear maps `A n`. obtain ⟨t, A, t_disj, t_meas, t_cover, ht, _⟩ : ∃ (t : ℕ → Set E) (A : ℕ → E →L[ℝ] E), Pairwise (Disjoint on t) ∧ (∀ n : ℕ, MeasurableSet (t n)) ∧ (s ⊆ ⋃ n : ℕ, t n) ∧ (∀ n : ℕ, ApproximatesLinearOn f (A n) (s ∩ t n) δ) ∧ (s.Nonempty → ∀ n, ∃ y ∈ s, A n = f' y) := exists_partition_approximatesLinearOn_of_hasFDerivWithinAt f s f' hf' (fun _ => δ) fun _ => δpos.ne' -- define a measurable function `g` which coincides with `A n` on `t n`. obtain ⟨g, g_meas, hg⟩ : ∃ g : E → E →L[ℝ] E, Measurable g ∧ ∀ (n : ℕ) (x : E), x ∈ t n → g x = A n := exists_measurable_piecewise t t_meas (fun n _ => A n) (fun n => measurable_const) <\| t_disj.mono fun i j h => by simp only [h.inter_eq, eqOn_empty] refine ⟨g, g_meas.aemeasurable, ?_⟩ -- reduce to checking that `f'` and `g` are close on almost all of `s ∩ t n`, for all `n`. suffices H : ∀ᵐ x : E ∂sum fun n ↦ μ.restrict (s ∩ t n), dist (g x) (f' x) ≤ ε by have : μ.restrict s ≤ sum fun n => μ.restrict (s ∩ t n) := by have : s = ⋃ n, s ∩ t n := by rw [← inter_iUnion] exact Subset.antisymm (subset_inter Subset.rfl t_cover) inter_subset_left conv_lhs => rw [this] exact restrict_iUnion_le exact ae_mono this H -- fix such an `n`. refine ae_sum_iff.2 fun n => ?_ -- on almost all `s ∩ t n`, `f' x` is close to `A n` thanks to -- `ApproximatesLinearOn.norm_fderiv_sub_le`. have E₁ : ∀ᵐ x : E ∂μ.restrict (s ∩ t n), ‖f' x - A n‖₊ ≤ δ := (ht n).norm_fderiv_sub_le μ (hs.inter (t_meas n)) f' fun x hx => (hf' x hx.1).mono inter_subset_left -- moreover, `g x` is equal to `A n` there. have E₂ : ∀ᵐ x : E ∂μ.restrict (s ∩ t n), g x = A n := by suffices H : ∀ᵐ x : E ∂μ.restrict (t n), g x = A n from ae_mono (restrict_mono inter_subset_right le_rfl) H filter_upwards [ae_restrict_mem (t_meas n)] exact hg n -- putting these two properties together gives the conclusion. filter_upwards [E₁, E₂] with x hx1 hx2 rw [← nndist_eq_nnnorm] at hx1 rw [hx2, dist_comm] exact hx1 #align measure_theory.ae_measurable_fderiv_within MeasureTheory.aemeasurable_fderivWithin theorem aemeasurable_ofReal_abs_det_fderivWithin (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) : AEMeasurable (fun x => ENNReal.ofReal \|(f' x).det\|) (μ.restrict s) := by apply ENNReal.measurable_ofReal.comp_aemeasurable refine continuous_abs.measurable.comp_aemeasurable ?_ refine ContinuousLinearMap.continuous_det.measurable.comp_aemeasurable ?_ exact aemeasurable_fderivWithin μ hs hf' #align measure_theory.ae_measurable_of_real_abs_det_fderiv_within MeasureTheory.aemeasurable_ofReal_abs_det_fderivWithin theorem aemeasurable_toNNReal_abs_det_fderivWithin (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) : AEMeasurable (fun x => \|(f' x).det\|.toNNReal) (μ.restrict s) := by apply measurable_real_toNNReal.comp_aemeasurable refine continuous_abs.measurable.comp_aemeasurable ?_ refine ContinuousLinearMap.continuous_det.measurable.comp_aemeasurable ?_ exact aemeasurable_fderivWithin μ hs hf' #align measure_theory.ae_measurable_to_nnreal_abs_det_fderiv_within MeasureTheory.aemeasurable_toNNReal_abs_det_fderivWithin theorem measurable_image_of_fderivWithin (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) : MeasurableSet (f '' s) := haveI : DifferentiableOn ℝ f s := fun x hx => (hf' x hx).differentiableWithinAt hs.image_of_continuousOn_injOn (DifferentiableOn.continuousOn this) hf #align measure_theory.measurable_image_of_fderiv_within MeasureTheory.measurable_image_of_fderivWithin theorem measurableEmbedding_of_fderivWithin (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) : MeasurableEmbedding (s.restrict f) := haveI : DifferentiableOn ℝ f s := fun x hx => (hf' x hx).differentiableWithinAt this.continuousOn.measurableEmbedding hs hf #align measure_theory.measurable_embedding_of_fderiv_within MeasureTheory.measurableEmbedding_of_fderivWithin theorem addHaar_image_le_lintegral_abs_det_fderiv_aux1 (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) {ε : ℝ≥0} (εpos : 0 < ε) : μ (f '' s) ≤ (∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) + 2 * ε * μ s := by have : ∀ A : E →L[ℝ] E, ∃ δ : ℝ≥0, 0 < δ ∧ (∀ B : E →L[ℝ] E, ‖B - A‖ ≤ δ → \|B.det - A.det\| ≤ ε) ∧ ∀ (t : Set E) (g : E → E), ApproximatesLinearOn g A t δ → μ (g '' t) ≤ (ENNReal.ofReal \|A.det\| + ε) * μ t := by intro A let m : ℝ≥0 := Real.toNNReal \|A.det\| + ε have I : ENNReal.ofReal \|A.det\| < m := by simp only [m, ENNReal.ofReal, lt_add_iff_pos_right, εpos, ENNReal.coe_lt_coe] rcases ((addHaar_image_le_mul_of_det_lt μ A I).and self_mem_nhdsWithin).exists with ⟨δ, h, δpos⟩ obtain ⟨δ', δ'pos, hδ'⟩ : ∃ (δ' : ℝ), 0 < δ' ∧ ∀ B, dist B A < δ' → dist B.det A.det < ↑ε := continuousAt_iff.1 ContinuousLinearMap.continuous_det.continuousAt ε εpos let δ'' : ℝ≥0 := ⟨δ' / 2, (half_pos δ'pos).le⟩ refine ⟨min δ δ'', lt_min δpos (half_pos δ'pos), ?_, ?_⟩ · intro B hB rw [← Real.dist_eq] apply (hδ' B _).le rw [dist_eq_norm] calc ‖B - A‖ ≤ (min δ δ'' : ℝ≥0) := hB _ ≤ δ'' := by simp only [le_refl, NNReal.coe_min, min_le_iff, or_true_iff] _ < δ' := half_lt_self δ'pos · intro t g htg exact h t g (htg.mono_num (min_le_left _ _)) choose δ hδ using this obtain ⟨t, A, t_disj, t_meas, t_cover, ht, -⟩ : ∃ (t : ℕ → Set E) (A : ℕ → E →L[ℝ] E), Pairwise (Disjoint on t) ∧ (∀ n : ℕ, MeasurableSet (t n)) ∧ (s ⊆ ⋃ n : ℕ, t n) ∧ (∀ n : ℕ, ApproximatesLinearOn f (A n) (s ∩ t n) (δ (A n))) ∧ (s.Nonempty → ∀ n, ∃ y ∈ s, A n = f' y) := exists_partition_approximatesLinearOn_of_hasFDerivWithinAt f s f' hf' δ fun A => (hδ A).1.ne' calc μ (f '' s) ≤ μ (⋃ n, f '' (s ∩ t n)) := by apply measure_mono rw [← image_iUnion, ← inter_iUnion] exact image_subset f (subset_inter Subset.rfl t_cover) _ ≤ ∑' n, μ (f '' (s ∩ t n)) := measure_iUnion_le _ _ ≤ ∑' n, (ENNReal.ofReal \|(A n).det\| + ε) * μ (s ∩ t n) := by apply ENNReal.tsum_le_tsum fun n => ?_ apply (hδ (A n)).2.2 exact ht n _ = ∑' n, ∫⁻ _ in s ∩ t n, ENNReal.ofReal \|(A n).det\| + ε ∂μ := by simp only [lintegral_const, MeasurableSet.univ, Measure.restrict_apply, univ_inter] _ ≤ ∑' n, ∫⁻ x in s ∩ t n, ENNReal.ofReal \|(f' x).det\| + 2 * ε ∂μ := by apply ENNReal.tsum_le_tsum fun n => ?_ apply lintegral_mono_ae filter_upwards [(ht n).norm_fderiv_sub_le μ (hs.inter (t_meas n)) f' fun x hx => (hf' x hx.1).mono inter_subset_left] intro x hx have I : \|(A n).det\| ≤ \|(f' x).det\| + ε := calc \|(A n).det\| = \|(f' x).det - ((f' x).det - (A n).det)\| := by congr 1; abel _ ≤ \|(f' x).det\| + \|(f' x).det - (A n).det\| := abs_sub _ _ _ ≤ \|(f' x).det\| + ε := add_le_add le_rfl ((hδ (A n)).2.1 _ hx) calc ENNReal.ofReal \|(A n).det\| + ε ≤ ENNReal.ofReal (\|(f' x).det\| + ε) + ε := by gcongr _ = ENNReal.ofReal \|(f' x).det\| + 2 * ε := by simp only [ENNReal.ofReal_add, abs_nonneg, two_mul, add_assoc, NNReal.zero_le_coe, ENNReal.ofReal_coe_nnreal] _ = ∫⁻ x in ⋃ n, s ∩ t n, ENNReal.ofReal \|(f' x).det\| + 2 * ε ∂μ := by have M : ∀ n : ℕ, MeasurableSet (s ∩ t n) := fun n => hs.inter (t_meas n) rw [lintegral_iUnion M] exact pairwise_disjoint_mono t_disj fun n => inter_subset_right _ = ∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| + 2 * ε ∂μ := by rw [← inter_iUnion, inter_eq_self_of_subset_left t_cover] _ = (∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) + 2 * ε * μ s := by simp only [lintegral_add_right' _ aemeasurable_const, set_lintegral_const] #align measure_theory.add_haar_image_le_lintegral_abs_det_fderiv_aux1 MeasureTheory.addHaar_image_le_lintegral_abs_det_fderiv_aux1 theorem addHaar_image_le_lintegral_abs_det_fderiv_aux2 (hs : MeasurableSet s) (h's : μ s ≠ ∞) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) : μ (f '' s) ≤ ∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ := by -- We just need to let the error tend to `0` in the previous lemma. have : Tendsto (fun ε : ℝ≥0 => (∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) + 2 * ε * μ s) (𝓝[>] 0) (𝓝 ((∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) + 2 * (0 : ℝ≥0) * μ s)) := by apply Tendsto.mono_left _ nhdsWithin_le_nhds refine tendsto_const_nhds.add ?_ refine ENNReal.Tendsto.mul_const ?_ (Or.inr h's) exact ENNReal.Tendsto.const_mul (ENNReal.tendsto_coe.2 tendsto_id) (Or.inr ENNReal.coe_ne_top) simp only [add_zero, zero_mul, mul_zero, ENNReal.coe_zero] at this apply ge_of_tendsto this filter_upwards [self_mem_nhdsWithin] intro ε εpos rw [mem_Ioi] at εpos exact addHaar_image_le_lintegral_abs_det_fderiv_aux1 μ hs hf' εpos #align measure_theory.add_haar_image_le_lintegral_abs_det_fderiv_aux2 MeasureTheory.addHaar_image_le_lintegral_abs_det_fderiv_aux2 theorem addHaar_image_le_lintegral_abs_det_fderiv (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) : μ (f '' s) ≤ ∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ := by let u n := disjointed (spanningSets μ) n have u_meas : ∀ n, MeasurableSet (u n) := by intro n apply MeasurableSet.disjointed fun i => ?_ exact measurable_spanningSets μ i have A : s = ⋃ n, s ∩ u n := by rw [← inter_iUnion, iUnion_disjointed, iUnion_spanningSets, inter_univ] calc μ (f '' s) ≤ ∑' n, μ (f '' (s ∩ u n)) := by conv_lhs => rw [A, image_iUnion] exact measure_iUnion_le _ _ ≤ ∑' n, ∫⁻ x in s ∩ u n, ENNReal.ofReal \|(f' x).det\| ∂μ := by apply ENNReal.tsum_le_tsum fun n => ?_ apply addHaar_image_le_lintegral_abs_det_fderiv_aux2 μ (hs.inter (u_meas n)) _ fun x hx => (hf' x hx.1).mono inter_subset_left have : μ (u n) < ∞ := lt_of_le_of_lt (measure_mono (disjointed_subset _ _)) (measure_spanningSets_lt_top μ n) exact ne_of_lt (lt_of_le_of_lt (measure_mono inter_subset_right) this) _ = ∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ := by conv_rhs => rw [A] rw [lintegral_iUnion] · intro n; exact hs.inter (u_meas n) · exact pairwise_disjoint_mono (disjoint_disjointed _) fun n => inter_subset_right #align measure_theory.add_haar_image_le_lintegral_abs_det_fderiv MeasureTheory.addHaar_image_le_lintegral_abs_det_fderiv theorem lintegral_abs_det_fderiv_le_addHaar_image_aux1 (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) {ε : ℝ≥0} (εpos : 0 < ε) : (∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) ≤ μ (f '' s) + 2 * ε * μ s := by have : ∀ A : E →L[ℝ] E, ∃ δ : ℝ≥0, 0 < δ ∧ (∀ B : E →L[ℝ] E, ‖B - A‖ ≤ δ → \|B.det - A.det\| ≤ ε) ∧ ∀ (t : Set E) (g : E → E), ApproximatesLinearOn g A t δ → ENNReal.ofReal \|A.det\| * μ t ≤ μ (g '' t) + ε * μ t := by intro A obtain ⟨δ', δ'pos, hδ'⟩ : ∃ (δ' : ℝ), 0 < δ' ∧ ∀ B, dist B A < δ' → dist B.det A.det < ↑ε := continuousAt_iff.1 ContinuousLinearMap.continuous_det.continuousAt ε εpos let δ'' : ℝ≥0 := ⟨δ' / 2, (half_pos δ'pos).le⟩ have I'' : ∀ B : E →L[ℝ] E, ‖B - A‖ ≤ ↑δ'' → \|B.det - A.det\| ≤ ↑ε := by intro B hB rw [← Real.dist_eq] apply (hδ' B _).le rw [dist_eq_norm] exact hB.trans_lt (half_lt_self δ'pos) rcases eq_or_ne A.det 0 with (hA \| hA) · refine ⟨δ'', half_pos δ'pos, I'', ?_⟩ simp only [hA, forall_const, zero_mul, ENNReal.ofReal_zero, imp_true_iff, zero_le, abs_zero] let m : ℝ≥0 := Real.toNNReal \|A.det\| - ε have I : (m : ℝ≥0∞) < ENNReal.ofReal \|A.det\| := by simp only [m, ENNReal.ofReal, ENNReal.coe_sub] apply ENNReal.sub_lt_self ENNReal.coe_ne_top · simpa only [abs_nonpos_iff, Real.toNNReal_eq_zero, ENNReal.coe_eq_zero, Ne] using hA · simp only [εpos.ne', ENNReal.coe_eq_zero, Ne, not_false_iff] rcases ((mul_le_addHaar_image_of_lt_det μ A I).and self_mem_nhdsWithin).exists with ⟨δ, h, δpos⟩ refine ⟨min δ δ'', lt_min δpos (half_pos δ'pos), ?_, ?_⟩ · intro B hB apply I'' _ (hB.trans _) simp only [le_refl, NNReal.coe_min, min_le_iff, or_true_iff] · intro t g htg rcases eq_or_ne (μ t) ∞ with (ht \| ht) · simp only [ht, εpos.ne', ENNReal.mul_top, ENNReal.coe_eq_zero, le_top, Ne, not_false_iff, _root_.add_top] have := h t g (htg.mono_num (min_le_left _ _)) rwa [ENNReal.coe_sub, ENNReal.sub_mul, tsub_le_iff_right] at this simp only [ht, imp_true_iff, Ne, not_false_iff] choose δ hδ using this obtain ⟨t, A, t_disj, t_meas, t_cover, ht, -⟩ : ∃ (t : ℕ → Set E) (A : ℕ → E →L[ℝ] E), Pairwise (Disjoint on t) ∧ (∀ n : ℕ, MeasurableSet (t n)) ∧ (s ⊆ ⋃ n : ℕ, t n) ∧ (∀ n : ℕ, ApproximatesLinearOn f (A n) (s ∩ t n) (δ (A n))) ∧ (s.Nonempty → ∀ n, ∃ y ∈ s, A n = f' y) := exists_partition_approximatesLinearOn_of_hasFDerivWithinAt f s f' hf' δ fun A => (hδ A).1.ne' have s_eq : s = ⋃ n, s ∩ t n := by rw [← inter_iUnion] exact Subset.antisymm (subset_inter Subset.rfl t_cover) inter_subset_left calc (∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) = ∑' n, ∫⁻ x in s ∩ t n, ENNReal.ofReal \|(f' x).det\| ∂μ := by conv_lhs => rw [s_eq] rw [lintegral_iUnion] · exact fun n => hs.inter (t_meas n) · exact pairwise_disjoint_mono t_disj fun n => inter_subset_right _ ≤ ∑' n, ∫⁻ _ in s ∩ t n, ENNReal.ofReal \|(A n).det\| + ε ∂μ := by apply ENNReal.tsum_le_tsum fun n => ?_ apply lintegral_mono_ae filter_upwards [(ht n).norm_fderiv_sub_le μ (hs.inter (t_meas n)) f' fun x hx => (hf' x hx.1).mono inter_subset_left] intro x hx have I : \|(f' x).det\| ≤ \|(A n).det\| + ε := calc \|(f' x).det\| = \|(A n).det + ((f' x).det - (A n).det)\| := by congr 1; abel _ ≤ \|(A n).det\| + \|(f' x).det - (A n).det\| := abs_add _ _ _ ≤ \|(A n).det\| + ε := add_le_add le_rfl ((hδ (A n)).2.1 _ hx) calc ENNReal.ofReal \|(f' x).det\| ≤ ENNReal.ofReal (\|(A n).det\| + ε) := ENNReal.ofReal_le_ofReal I _ = ENNReal.ofReal \|(A n).det\| + ε := by simp only [ENNReal.ofReal_add, abs_nonneg, NNReal.zero_le_coe, ENNReal.ofReal_coe_nnreal] _ = ∑' n, (ENNReal.ofReal \|(A n).det\| * μ (s ∩ t n) + ε * μ (s ∩ t n)) := by simp only [set_lintegral_const, lintegral_add_right _ measurable_const] _ ≤ ∑' n, (μ (f '' (s ∩ t n)) + ε * μ (s ∩ t n) + ε * μ (s ∩ t n)) := by gcongr exact (hδ (A _)).2.2 _ _ (ht _) _ = μ (f '' s) + 2 * ε * μ s := by conv_rhs => rw [s_eq] rw [image_iUnion, measure_iUnion]; rotate_left · intro i j hij apply Disjoint.image _ hf inter_subset_left inter_subset_left exact Disjoint.mono inter_subset_right inter_subset_right (t_disj hij) · intro i exact measurable_image_of_fderivWithin (hs.inter (t_meas i)) (fun x hx => (hf' x hx.1).mono inter_subset_left) (hf.mono inter_subset_left) rw [measure_iUnion]; rotate_left · exact pairwise_disjoint_mono t_disj fun i => inter_subset_right · exact fun i => hs.inter (t_meas i) rw [← ENNReal.tsum_mul_left, ← ENNReal.tsum_add] congr 1 ext1 i rw [mul_assoc, two_mul, add_assoc] #align measure_theory.lintegral_abs_det_fderiv_le_add_haar_image_aux1 MeasureTheory.lintegral_abs_det_fderiv_le_addHaar_image_aux1 theorem lintegral_abs_det_fderiv_le_addHaar_image_aux2 (hs : MeasurableSet s) (h's : μ s ≠ ∞) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) : (∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) ≤ μ (f '' s) := by -- We just need to let the error tend to `0` in the previous lemma. have : Tendsto (fun ε : ℝ≥0 => μ (f '' s) + 2 * ε * μ s) (𝓝[>] 0) (𝓝 (μ (f '' s) + 2 * (0 : ℝ≥0) * μ s)) := by apply Tendsto.mono_left _ nhdsWithin_le_nhds refine tendsto_const_nhds.add ?_ refine ENNReal.Tendsto.mul_const ?_ (Or.inr h's) exact ENNReal.Tendsto.const_mul (ENNReal.tendsto_coe.2 tendsto_id) (Or.inr ENNReal.coe_ne_top) simp only [add_zero, zero_mul, mul_zero, ENNReal.coe_zero] at this apply ge_of_tendsto this filter_upwards [self_mem_nhdsWithin] intro ε εpos rw [mem_Ioi] at εpos exact lintegral_abs_det_fderiv_le_addHaar_image_aux1 μ hs hf' hf εpos #align measure_theory.lintegral_abs_det_fderiv_le_add_haar_image_aux2 MeasureTheory.lintegral_abs_det_fderiv_le_addHaar_image_aux2 theorem lintegral_abs_det_fderiv_le_addHaar_image (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) : (∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) ≤ μ (f '' s) := by let u n := disjointed (spanningSets μ) n have u_meas : ∀ n, MeasurableSet (u n) := by intro n apply MeasurableSet.disjointed fun i => ?_ exact measurable_spanningSets μ i have A : s = ⋃ n, s ∩ u n := by rw [← inter_iUnion, iUnion_disjointed, iUnion_spanningSets, inter_univ] calc (∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) = ∑' n, ∫⁻ x in s ∩ u n, ENNReal.ofReal \|(f' x).det\| ∂μ := by conv_lhs => rw [A] rw [lintegral_iUnion] · intro n; exact hs.inter (u_meas n) · exact pairwise_disjoint_mono (disjoint_disjointed _) fun n => inter_subset_right _ ≤ ∑' n, μ (f '' (s ∩ u n)) := by apply ENNReal.tsum_le_tsum fun n => ?_ apply lintegral_abs_det_fderiv_le_addHaar_image_aux2 μ (hs.inter (u_meas n)) _ (fun x hx => (hf' x hx.1).mono inter_subset_left) (hf.mono inter_subset_left) have : μ (u n) < ∞ := lt_of_le_of_lt (measure_mono (disjointed_subset _ _)) (measure_spanningSets_lt_top μ n) exact ne_of_lt (lt_of_le_of_lt (measure_mono inter_subset_right) this) _ = μ (f '' s) := by conv_rhs => rw [A, image_iUnion] rw [measure_iUnion] · intro i j hij apply Disjoint.image _ hf inter_subset_left inter_subset_left exact Disjoint.mono inter_subset_right inter_subset_right (disjoint_disjointed _ hij) · intro i exact measurable_image_of_fderivWithin (hs.inter (u_meas i)) (fun x hx => (hf' x hx.1).mono inter_subset_left) (hf.mono inter_subset_left) #align measure_theory.lintegral_abs_det_fderiv_le_add_haar_image MeasureTheory.lintegral_abs_det_fderiv_le_addHaar_image theorem lintegral_abs_det_fderiv_eq_addHaar_image (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) : (∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| ∂μ) = μ (f '' s) := le_antisymm (lintegral_abs_det_fderiv_le_addHaar_image μ hs hf' hf) (addHaar_image_le_lintegral_abs_det_fderiv μ hs hf') #align measure_theory.lintegral_abs_det_fderiv_eq_add_haar_image MeasureTheory.lintegral_abs_det_fderiv_eq_addHaar_image theorem map_withDensity_abs_det_fderiv_eq_addHaar (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) (h'f : Measurable f) : Measure.map f ((μ.restrict s).withDensity fun x => ENNReal.ofReal \|(f' x).det\|) = μ.restrict (f '' s) := by apply Measure.ext fun t ht => ?_ rw [map_apply h'f ht, withDensity_apply _ (h'f ht), Measure.restrict_apply ht, restrict_restrict (h'f ht), lintegral_abs_det_fderiv_eq_addHaar_image μ ((h'f ht).inter hs) (fun x hx => (hf' x hx.2).mono inter_subset_right) (hf.mono inter_subset_right), image_preimage_inter] #align measure_theory.map_with_density_abs_det_fderiv_eq_add_haar MeasureTheory.map_withDensity_abs_det_fderiv_eq_addHaar theorem restrict_map_withDensity_abs_det_fderiv_eq_addHaar (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) : Measure.map (s.restrict f) (comap (↑) (μ.withDensity fun x => ENNReal.ofReal \|(f' x).det\|)) = μ.restrict (f '' s) := by obtain ⟨u, u_meas, uf⟩ : ∃ u, Measurable u ∧ EqOn u f s := by classical refine ⟨piecewise s f 0, ?_, piecewise_eqOn _ _ _⟩ refine ContinuousOn.measurable_piecewise ?_ continuous_zero.continuousOn hs have : DifferentiableOn ℝ f s := fun x hx => (hf' x hx).differentiableWithinAt exact this.continuousOn have u' : ∀ x ∈ s, HasFDerivWithinAt u (f' x) s x := fun x hx => (hf' x hx).congr (fun y hy => uf hy) (uf hx) set F : s → E := u ∘ (↑) with hF have A : Measure.map F (comap (↑) (μ.withDensity fun x => ENNReal.ofReal \|(f' x).det\|)) = μ.restrict (u '' s) := by rw [hF, ← Measure.map_map u_meas measurable_subtype_coe, map_comap_subtype_coe hs, restrict_withDensity hs] exact map_withDensity_abs_det_fderiv_eq_addHaar μ hs u' (hf.congr uf.symm) u_meas rw [uf.image_eq] at A have : F = s.restrict f := by ext x exact uf x.2 rwa [this] at A #align measure_theory.restrict_map_with_density_abs_det_fderiv_eq_add_haar MeasureTheory.restrict_map_withDensity_abs_det_fderiv_eq_addHaar theorem lintegral_image_eq_lintegral_abs_det_fderiv_mul (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) (g : E → ℝ≥0∞) : ∫⁻ x in f '' s, g x ∂μ = ∫⁻ x in s, ENNReal.ofReal \|(f' x).det\| * g (f x) ∂μ := by rw [← restrict_map_withDensity_abs_det_fderiv_eq_addHaar μ hs hf' hf, (measurableEmbedding_of_fderivWithin hs hf' hf).lintegral_map] simp only [Set.restrict_apply, ← Function.comp_apply (f := g)] rw [← (MeasurableEmbedding.subtype_coe hs).lintegral_map, map_comap_subtype_coe hs, set_lintegral_withDensity_eq_set_lintegral_mul_non_measurable₀ _ _ _ hs] · simp only [Pi.mul_apply] · simp only [eventually_true, ENNReal.ofReal_lt_top] · exact aemeasurable_ofReal_abs_det_fderivWithin μ hs hf' #align measure_theory.lintegral_image_eq_lintegral_abs_det_fderiv_mul MeasureTheory.lintegral_image_eq_lintegral_abs_det_fderiv_mul theorem integrableOn_image_iff_integrableOn_abs_det_fderiv_smul (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) (g : E → F) : IntegrableOn g (f '' s) μ ↔ IntegrableOn (fun x => \|(f' x).det\| • g (f x)) s μ := by rw [IntegrableOn, ← restrict_map_withDensity_abs_det_fderiv_eq_addHaar μ hs hf' hf, (measurableEmbedding_of_fderivWithin hs hf' hf).integrable_map_iff] simp only [Set.restrict_eq, ← Function.comp.assoc, ENNReal.ofReal] rw [← (MeasurableEmbedding.subtype_coe hs).integrable_map_iff, map_comap_subtype_coe hs, restrict_withDensity hs, integrable_withDensity_iff_integrable_coe_smul₀] · simp_rw [IntegrableOn, Real.coe_toNNReal _ (abs_nonneg _), Function.comp_apply] · exact aemeasurable_toNNReal_abs_det_fderivWithin μ hs hf' #align measure_theory.integrable_on_image_iff_integrable_on_abs_det_fderiv_smul MeasureTheory.integrableOn_image_iff_integrableOn_abs_det_fderiv_smul	Mathlib/MeasureTheory/Function/Jacobian.lean	1,193	1,203	theorem integral_image_eq_integral_abs_det_fderiv_smul (hs : MeasurableSet s) (hf' : ∀ x ∈ s, HasFDerivWithinAt f (f' x) s x) (hf : InjOn f s) (g : E → F) : ∫ x in f '' s, g x ∂μ = ∫ x in s, \|(f' x).det\| • g (f x) ∂μ := by	rw [← restrict_map_withDensity_abs_det_fderiv_eq_addHaar μ hs hf' hf, (measurableEmbedding_of_fderivWithin hs hf' hf).integral_map] simp only [Set.restrict_apply, ← Function.comp_apply (f := g), ENNReal.ofReal] rw [← (MeasurableEmbedding.subtype_coe hs).integral_map, map_comap_subtype_coe hs, setIntegral_withDensity_eq_setIntegral_smul₀ (aemeasurable_toNNReal_abs_det_fderivWithin μ hs hf') _ hs] congr with x rw [NNReal.smul_def, Real.coe_toNNReal _ (abs_nonneg (f' x).det)]
namespace Nat @[reducible] def Coprime (m n : Nat) : Prop := gcd m n = 1 instance (m n : Nat) : Decidable (Coprime m n) := inferInstanceAs (Decidable (_ = 1)) theorem coprime_iff_gcd_eq_one : Coprime m n ↔ gcd m n = 1 := .rfl theorem Coprime.gcd_eq_one : Coprime m n → gcd m n = 1 := id theorem Coprime.symm : Coprime n m → Coprime m n := (gcd_comm m n).trans theorem coprime_comm : Coprime n m ↔ Coprime m n := ⟨Coprime.symm, Coprime.symm⟩ theorem Coprime.dvd_of_dvd_mul_right (H1 : Coprime k n) (H2 : k ∣ m * n) : k ∣ m := by let t := dvd_gcd (Nat.dvd_mul_left k m) H2 rwa [gcd_mul_left, H1.gcd_eq_one, Nat.mul_one] at t theorem Coprime.dvd_of_dvd_mul_left (H1 : Coprime k m) (H2 : k ∣ m * n) : k ∣ n := H1.dvd_of_dvd_mul_right (by rwa [Nat.mul_comm]) theorem Coprime.gcd_mul_left_cancel (m : Nat) (H : Coprime k n) : gcd (k * m) n = gcd m n := have H1 : Coprime (gcd (k * m) n) k := by rw [Coprime, Nat.gcd_assoc, H.symm.gcd_eq_one, gcd_one_right] Nat.dvd_antisymm (dvd_gcd (H1.dvd_of_dvd_mul_left (gcd_dvd_left _ _)) (gcd_dvd_right _ _)) (gcd_dvd_gcd_mul_left _ _ _) theorem Coprime.gcd_mul_right_cancel (m : Nat) (H : Coprime k n) : gcd (m * k) n = gcd m n := by rw [Nat.mul_comm m k, H.gcd_mul_left_cancel m] theorem Coprime.gcd_mul_left_cancel_right (n : Nat) (H : Coprime k m) : gcd m (k * n) = gcd m n := by rw [gcd_comm m n, gcd_comm m (k * n), H.gcd_mul_left_cancel n] theorem Coprime.gcd_mul_right_cancel_right (n : Nat) (H : Coprime k m) : gcd m (n * k) = gcd m n := by rw [Nat.mul_comm n k, H.gcd_mul_left_cancel_right n] theorem coprime_div_gcd_div_gcd (H : 0 < gcd m n) : Coprime (m / gcd m n) (n / gcd m n) := by rw [coprime_iff_gcd_eq_one, gcd_div (gcd_dvd_left m n) (gcd_dvd_right m n), Nat.div_self H] theorem not_coprime_of_dvd_of_dvd (dgt1 : 1 < d) (Hm : d ∣ m) (Hn : d ∣ n) : ¬ Coprime m n := fun co => Nat.not_le_of_gt dgt1 <\| Nat.le_of_dvd Nat.zero_lt_one <\| by rw [← co.gcd_eq_one]; exact dvd_gcd Hm Hn theorem exists_coprime (m n : Nat) : ∃ m' n', Coprime m' n' ∧ m = m' * gcd m n ∧ n = n' * gcd m n := by cases eq_zero_or_pos (gcd m n) with \| inl h0 => rw [gcd_eq_zero_iff] at h0 refine ⟨1, 1, gcd_one_left 1, ?_⟩ simp [h0] \| inr hpos => exact ⟨_, _, coprime_div_gcd_div_gcd hpos, (Nat.div_mul_cancel (gcd_dvd_left m n)).symm, (Nat.div_mul_cancel (gcd_dvd_right m n)).symm⟩ theorem exists_coprime' (H : 0 < gcd m n) : ∃ g m' n', 0 < g ∧ Coprime m' n' ∧ m = m' * g ∧ n = n' * g := let ⟨m', n', h⟩ := exists_coprime m n; ⟨_, m', n', H, h⟩ theorem Coprime.mul (H1 : Coprime m k) (H2 : Coprime n k) : Coprime (m * n) k := (H1.gcd_mul_left_cancel n).trans H2 theorem Coprime.mul_right (H1 : Coprime k m) (H2 : Coprime k n) : Coprime k (m * n) := (H1.symm.mul H2.symm).symm	.lake/packages/batteries/Batteries/Data/Nat/Gcd.lean	87	91	theorem Coprime.coprime_dvd_left (H1 : m ∣ k) (H2 : Coprime k n) : Coprime m n := by	apply eq_one_of_dvd_one rw [Coprime] at H2 have := Nat.gcd_dvd_gcd_of_dvd_left n H1 rwa [← H2]
import Mathlib.CategoryTheory.Balanced import Mathlib.CategoryTheory.LiftingProperties.Basic #align_import category_theory.limits.shapes.strong_epi from "leanprover-community/mathlib"@"32253a1a1071173b33dc7d6a218cf722c6feb514" universe v u namespace CategoryTheory variable {C : Type u} [Category.{v} C] variable {P Q : C} class StrongEpi (f : P ⟶ Q) : Prop where epi : Epi f llp : ∀ ⦃X Y : C⦄ (z : X ⟶ Y) [Mono z], HasLiftingProperty f z #align category_theory.strong_epi CategoryTheory.StrongEpi #align category_theory.strong_epi.epi CategoryTheory.StrongEpi.epi theorem StrongEpi.mk' {f : P ⟶ Q} [Epi f] (hf : ∀ (X Y : C) (z : X ⟶ Y) (_ : Mono z) (u : P ⟶ X) (v : Q ⟶ Y) (sq : CommSq u f z v), sq.HasLift) : StrongEpi f := { epi := inferInstance llp := fun {X Y} z hz => ⟨fun {u v} sq => hf X Y z hz u v sq⟩ } #align category_theory.strong_epi.mk' CategoryTheory.StrongEpi.mk' class StrongMono (f : P ⟶ Q) : Prop where mono : Mono f rlp : ∀ ⦃X Y : C⦄ (z : X ⟶ Y) [Epi z], HasLiftingProperty z f #align category_theory.strong_mono CategoryTheory.StrongMono theorem StrongMono.mk' {f : P ⟶ Q} [Mono f] (hf : ∀ (X Y : C) (z : X ⟶ Y) (_ : Epi z) (u : X ⟶ P) (v : Y ⟶ Q) (sq : CommSq u z f v), sq.HasLift) : StrongMono f where mono := inferInstance rlp := fun {X Y} z hz => ⟨fun {u v} sq => hf X Y z hz u v sq⟩ #align category_theory.strong_mono.mk' CategoryTheory.StrongMono.mk' attribute [instance 100] StrongEpi.llp attribute [instance 100] StrongMono.rlp instance (priority := 100) epi_of_strongEpi (f : P ⟶ Q) [StrongEpi f] : Epi f := StrongEpi.epi #align category_theory.epi_of_strong_epi CategoryTheory.epi_of_strongEpi instance (priority := 100) mono_of_strongMono (f : P ⟶ Q) [StrongMono f] : Mono f := StrongMono.mono #align category_theory.mono_of_strong_mono CategoryTheory.mono_of_strongMono section variable {R : C} (f : P ⟶ Q) (g : Q ⟶ R) theorem strongEpi_comp [StrongEpi f] [StrongEpi g] : StrongEpi (f ≫ g) := { epi := epi_comp _ _ llp := by intros infer_instance } #align category_theory.strong_epi_comp CategoryTheory.strongEpi_comp theorem strongMono_comp [StrongMono f] [StrongMono g] : StrongMono (f ≫ g) := { mono := mono_comp _ _ rlp := by intros infer_instance } #align category_theory.strong_mono_comp CategoryTheory.strongMono_comp theorem strongEpi_of_strongEpi [StrongEpi (f ≫ g)] : StrongEpi g := { epi := epi_of_epi f g llp := fun {X Y} z _ => by constructor intro u v sq have h₀ : (f ≫ u) ≫ z = (f ≫ g) ≫ v := by simp only [Category.assoc, sq.w] exact CommSq.HasLift.mk' ⟨(CommSq.mk h₀).lift, by simp only [← cancel_mono z, Category.assoc, CommSq.fac_right, sq.w], by simp⟩ } #align category_theory.strong_epi_of_strong_epi CategoryTheory.strongEpi_of_strongEpi theorem strongMono_of_strongMono [StrongMono (f ≫ g)] : StrongMono f := { mono := mono_of_mono f g rlp := fun {X Y} z => by intros constructor intro u v sq have h₀ : u ≫ f ≫ g = z ≫ v ≫ g := by rw [← Category.assoc, eq_whisker sq.w, Category.assoc] exact CommSq.HasLift.mk' ⟨(CommSq.mk h₀).lift, by simp, by simp [← cancel_epi z, sq.w]⟩ } #align category_theory.strong_mono_of_strong_mono CategoryTheory.strongMono_of_strongMono instance (priority := 100) strongEpi_of_isIso [IsIso f] : StrongEpi f where epi := by infer_instance llp {X Y} z := HasLiftingProperty.of_left_iso _ _ #align category_theory.strong_epi_of_is_iso CategoryTheory.strongEpi_of_isIso instance (priority := 100) strongMono_of_isIso [IsIso f] : StrongMono f where mono := by infer_instance rlp {X Y} z := HasLiftingProperty.of_right_iso _ _ #align category_theory.strong_mono_of_is_iso CategoryTheory.strongMono_of_isIso theorem StrongEpi.of_arrow_iso {A B A' B' : C} {f : A ⟶ B} {g : A' ⟶ B'} (e : Arrow.mk f ≅ Arrow.mk g) [h : StrongEpi f] : StrongEpi g := { epi := by rw [Arrow.iso_w' e] haveI := epi_comp f e.hom.right apply epi_comp llp := fun {X Y} z => by intro apply HasLiftingProperty.of_arrow_iso_left e z } #align category_theory.strong_epi.of_arrow_iso CategoryTheory.StrongEpi.of_arrow_iso theorem StrongMono.of_arrow_iso {A B A' B' : C} {f : A ⟶ B} {g : A' ⟶ B'} (e : Arrow.mk f ≅ Arrow.mk g) [h : StrongMono f] : StrongMono g := { mono := by rw [Arrow.iso_w' e] haveI := mono_comp f e.hom.right apply mono_comp rlp := fun {X Y} z => by intro apply HasLiftingProperty.of_arrow_iso_right z e } #align category_theory.strong_mono.of_arrow_iso CategoryTheory.StrongMono.of_arrow_iso	Mathlib/CategoryTheory/Limits/Shapes/StrongEpi.lean	172	175	theorem StrongEpi.iff_of_arrow_iso {A B A' B' : C} {f : A ⟶ B} {g : A' ⟶ B'} (e : Arrow.mk f ≅ Arrow.mk g) : StrongEpi f ↔ StrongEpi g := by	constructor <;> intro exacts [StrongEpi.of_arrow_iso e, StrongEpi.of_arrow_iso e.symm]
import Mathlib.Analysis.BoxIntegral.DivergenceTheorem import Mathlib.Analysis.BoxIntegral.Integrability import Mathlib.Analysis.Calculus.Deriv.Basic import Mathlib.MeasureTheory.Constructions.Prod.Integral import Mathlib.MeasureTheory.Integral.IntervalIntegral import Mathlib.Analysis.Calculus.FDeriv.Equiv #align_import measure_theory.integral.divergence_theorem from "leanprover-community/mathlib"@"3bce8d800a6f2b8f63fe1e588fd76a9ff4adcebe" open Set Finset TopologicalSpace Function BoxIntegral MeasureTheory Filter open scoped Classical Topology Interval universe u namespace MeasureTheory variable {E : Type u} [NormedAddCommGroup E] [NormedSpace ℝ E] [CompleteSpace E] section variable {n : ℕ} local macro:arg t:term:max noWs "ⁿ" : term => `(Fin n → $t) local macro:arg t:term:max noWs "ⁿ⁺¹" : term => `(Fin (n + 1) → $t) local notation "e " i => Pi.single i 1 section theorem integral_divergence_of_hasFDerivWithinAt_off_countable_aux₁ (I : Box (Fin (n + 1))) (f : ℝⁿ⁺¹ → Eⁿ⁺¹) (f' : ℝⁿ⁺¹ → ℝⁿ⁺¹ →L[ℝ] Eⁿ⁺¹) (s : Set ℝⁿ⁺¹) (hs : s.Countable) (Hc : ContinuousOn f (Box.Icc I)) (Hd : ∀ x ∈ (Box.Icc I) \ s, HasFDerivWithinAt f (f' x) (Box.Icc I) x) (Hi : IntegrableOn (fun x => ∑ i, f' x (e i) i) (Box.Icc I)) : (∫ x in Box.Icc I, ∑ i, f' x (e i) i) = ∑ i : Fin (n + 1), ((∫ x in Box.Icc (I.face i), f (i.insertNth (I.upper i) x) i) - ∫ x in Box.Icc (I.face i), f (i.insertNth (I.lower i) x) i) := by simp only [← setIntegral_congr_set_ae (Box.coe_ae_eq_Icc _)] have A := (Hi.mono_set Box.coe_subset_Icc).hasBoxIntegral ⊥ rfl have B := hasIntegral_GP_divergence_of_forall_hasDerivWithinAt I f f' (s ∩ Box.Icc I) (hs.mono inter_subset_left) (fun x hx => Hc _ hx.2) fun x hx => Hd _ ⟨hx.1, fun h => hx.2 ⟨h, hx.1⟩⟩ rw [continuousOn_pi] at Hc refine (A.unique B).trans (sum_congr rfl fun i _ => ?_) refine congr_arg₂ Sub.sub ?_ ?_ · have := Box.continuousOn_face_Icc (Hc i) (Set.right_mem_Icc.2 (I.lower_le_upper i)) have := (this.integrableOn_compact (μ := volume) (Box.isCompact_Icc _)).mono_set Box.coe_subset_Icc exact (this.hasBoxIntegral ⊥ rfl).integral_eq · have := Box.continuousOn_face_Icc (Hc i) (Set.left_mem_Icc.2 (I.lower_le_upper i)) have := (this.integrableOn_compact (μ := volume) (Box.isCompact_Icc _)).mono_set Box.coe_subset_Icc exact (this.hasBoxIntegral ⊥ rfl).integral_eq #align measure_theory.integral_divergence_of_has_fderiv_within_at_off_countable_aux₁ MeasureTheory.integral_divergence_of_hasFDerivWithinAt_off_countable_aux₁ theorem integral_divergence_of_hasFDerivWithinAt_off_countable_aux₂ (I : Box (Fin (n + 1))) (f : ℝⁿ⁺¹ → Eⁿ⁺¹) (f' : ℝⁿ⁺¹ → ℝⁿ⁺¹ →L[ℝ] Eⁿ⁺¹) (s : Set ℝⁿ⁺¹) (hs : s.Countable) (Hc : ContinuousOn f (Box.Icc I)) (Hd : ∀ x ∈ Box.Ioo I \ s, HasFDerivAt f (f' x) x) (Hi : IntegrableOn (∑ i, f' · (e i) i) (Box.Icc I)) : (∫ x in Box.Icc I, ∑ i, f' x (e i) i) = ∑ i : Fin (n + 1), ((∫ x in Box.Icc (I.face i), f (i.insertNth (I.upper i) x) i) - ∫ x in Box.Icc (I.face i), f (i.insertNth (I.lower i) x) i) := by rcases I.exists_seq_mono_tendsto with ⟨J, hJ_sub, hJl, hJu⟩ have hJ_sub' : ∀ k, Box.Icc (J k) ⊆ Box.Icc I := fun k => (hJ_sub k).trans I.Ioo_subset_Icc have hJ_le : ∀ k, J k ≤ I := fun k => Box.le_iff_Icc.2 (hJ_sub' k) have HcJ : ∀ k, ContinuousOn f (Box.Icc (J k)) := fun k => Hc.mono (hJ_sub' k) have HdJ : ∀ (k), ∀ x ∈ (Box.Icc (J k)) \ s, HasFDerivWithinAt f (f' x) (Box.Icc (J k)) x := fun k x hx => (Hd x ⟨hJ_sub k hx.1, hx.2⟩).hasFDerivWithinAt have HiJ : ∀ k, IntegrableOn (∑ i, f' · (e i) i) (Box.Icc (J k)) volume := fun k => Hi.mono_set (hJ_sub' k) -- Apply the previous lemma to `J k`. have HJ_eq := fun k => integral_divergence_of_hasFDerivWithinAt_off_countable_aux₁ (J k) f f' s hs (HcJ k) (HdJ k) (HiJ k) -- Note that the LHS of `HJ_eq k` tends to the LHS of the goal as `k → ∞`. have hI_tendsto : Tendsto (fun k => ∫ x in Box.Icc (J k), ∑ i, f' x (e i) i) atTop (𝓝 (∫ x in Box.Icc I, ∑ i, f' x (e i) i)) := by simp only [IntegrableOn, ← Measure.restrict_congr_set (Box.Ioo_ae_eq_Icc _)] at Hi ⊢ rw [← Box.iUnion_Ioo_of_tendsto J.monotone hJl hJu] at Hi ⊢ exact tendsto_setIntegral_of_monotone (fun k => (J k).measurableSet_Ioo) (Box.Ioo.comp J).monotone Hi -- Thus it suffices to prove the same about the RHS. refine tendsto_nhds_unique_of_eventuallyEq hI_tendsto ?_ (eventually_of_forall HJ_eq) clear hI_tendsto rw [tendsto_pi_nhds] at hJl hJu suffices ∀ (i : Fin (n + 1)) (c : ℕ → ℝ) (d), (∀ k, c k ∈ Icc (I.lower i) (I.upper i)) → Tendsto c atTop (𝓝 d) → Tendsto (fun k => ∫ x in Box.Icc ((J k).face i), f (i.insertNth (c k) x) i) atTop (𝓝 <\| ∫ x in Box.Icc (I.face i), f (i.insertNth d x) i) by rw [Box.Icc_eq_pi] at hJ_sub' refine tendsto_finset_sum _ fun i _ => (this _ _ _ ?_ (hJu _)).sub (this _ _ _ ?_ (hJl _)) exacts [fun k => hJ_sub' k (J k).upper_mem_Icc _ trivial, fun k => hJ_sub' k (J k).lower_mem_Icc _ trivial] intro i c d hc hcd have hd : d ∈ Icc (I.lower i) (I.upper i) := isClosed_Icc.mem_of_tendsto hcd (eventually_of_forall hc) have Hic : ∀ k, IntegrableOn (fun x => f (i.insertNth (c k) x) i) (Box.Icc (I.face i)) := fun k => (Box.continuousOn_face_Icc ((continuous_apply i).comp_continuousOn Hc) (hc k)).integrableOn_Icc have Hid : IntegrableOn (fun x => f (i.insertNth d x) i) (Box.Icc (I.face i)) := (Box.continuousOn_face_Icc ((continuous_apply i).comp_continuousOn Hc) hd).integrableOn_Icc have H : Tendsto (fun k => ∫ x in Box.Icc ((J k).face i), f (i.insertNth d x) i) atTop (𝓝 <\| ∫ x in Box.Icc (I.face i), f (i.insertNth d x) i) := by have hIoo : (⋃ k, Box.Ioo ((J k).face i)) = Box.Ioo (I.face i) := Box.iUnion_Ioo_of_tendsto ((Box.monotone_face i).comp J.monotone) (tendsto_pi_nhds.2 fun _ => hJl _) (tendsto_pi_nhds.2 fun _ => hJu _) simp only [IntegrableOn, ← Measure.restrict_congr_set (Box.Ioo_ae_eq_Icc _), ← hIoo] at Hid ⊢ exact tendsto_setIntegral_of_monotone (fun k => ((J k).face i).measurableSet_Ioo) (Box.Ioo.monotone.comp ((Box.monotone_face i).comp J.monotone)) Hid refine H.congr_dist (Metric.nhds_basis_closedBall.tendsto_right_iff.2 fun ε εpos => ?_) have hvol_pos : ∀ J : Box (Fin n), 0 < ∏ j, (J.upper j - J.lower j) := fun J => prod_pos fun j hj => sub_pos.2 <\| J.lower_lt_upper _ rcases Metric.uniformContinuousOn_iff_le.1 (I.isCompact_Icc.uniformContinuousOn_of_continuous Hc) (ε / ∏ j, ((I.face i).upper j - (I.face i).lower j)) (div_pos εpos (hvol_pos (I.face i))) with ⟨δ, δpos, hδ⟩ refine (hcd.eventually (Metric.ball_mem_nhds _ δpos)).mono fun k hk => ?_ have Hsub : Box.Icc ((J k).face i) ⊆ Box.Icc (I.face i) := Box.le_iff_Icc.1 (Box.face_mono (hJ_le _) i) rw [mem_closedBall_zero_iff, Real.norm_eq_abs, abs_of_nonneg dist_nonneg, dist_eq_norm, ← integral_sub (Hid.mono_set Hsub) ((Hic _).mono_set Hsub)] calc ‖∫ x in Box.Icc ((J k).face i), f (i.insertNth d x) i - f (i.insertNth (c k) x) i‖ ≤ (ε / ∏ j, ((I.face i).upper j - (I.face i).lower j)) * (volume (Box.Icc ((J k).face i))).toReal := by refine norm_setIntegral_le_of_norm_le_const' (((J k).face i).measure_Icc_lt_top _) ((J k).face i).measurableSet_Icc fun x hx => ?_ rw [← dist_eq_norm] calc dist (f (i.insertNth d x) i) (f (i.insertNth (c k) x) i) ≤ dist (f (i.insertNth d x)) (f (i.insertNth (c k) x)) := dist_le_pi_dist (f (i.insertNth d x)) (f (i.insertNth (c k) x)) i _ ≤ ε / ∏ j, ((I.face i).upper j - (I.face i).lower j) := hδ _ (I.mapsTo_insertNth_face_Icc hd <\| Hsub hx) _ (I.mapsTo_insertNth_face_Icc (hc _) <\| Hsub hx) ?_ rw [Fin.dist_insertNth_insertNth, dist_self, dist_comm] exact max_le hk.le δpos.lt.le _ ≤ ε := by rw [Box.Icc_def, Real.volume_Icc_pi_toReal ((J k).face i).lower_le_upper, ← le_div_iff (hvol_pos _)] gcongr exacts [hvol_pos _, fun _ _ ↦ sub_nonneg.2 (Box.lower_le_upper _ _), (hJ_sub' _ (J _).upper_mem_Icc).2 _, (hJ_sub' _ (J _).lower_mem_Icc).1 _] #align measure_theory.integral_divergence_of_has_fderiv_within_at_off_countable_aux₂ MeasureTheory.integral_divergence_of_hasFDerivWithinAt_off_countable_aux₂ variable (a b : Fin (n + 1) → ℝ) local notation "face " i => Set.Icc (a ∘ Fin.succAbove i) (b ∘ Fin.succAbove i) local notation:max "frontFace " i:arg => Fin.insertNth i (b i) local notation:max "backFace " i:arg => Fin.insertNth i (a i) theorem integral_divergence_of_hasFDerivWithinAt_off_countable (hle : a ≤ b) (f : ℝⁿ⁺¹ → Eⁿ⁺¹) (f' : ℝⁿ⁺¹ → ℝⁿ⁺¹ →L[ℝ] Eⁿ⁺¹) (s : Set ℝⁿ⁺¹) (hs : s.Countable) (Hc : ContinuousOn f (Icc a b)) (Hd : ∀ x ∈ (Set.pi univ fun i => Ioo (a i) (b i)) \ s, HasFDerivAt f (f' x) x) (Hi : IntegrableOn (fun x => ∑ i, f' x (e i) i) (Icc a b)) : (∫ x in Icc a b, ∑ i, f' x (e i) i) = ∑ i : Fin (n + 1), ((∫ x in face i, f (frontFace i x) i) - ∫ x in face i, f (backFace i x) i) := by rcases em (∃ i, a i = b i) with (⟨i, hi⟩ \| hne) · -- First we sort out the trivial case `∃ i, a i = b i`. rw [volume_pi, ← setIntegral_congr_set_ae Measure.univ_pi_Ioc_ae_eq_Icc] have hi' : Ioc (a i) (b i) = ∅ := Ioc_eq_empty hi.not_lt have : (pi Set.univ fun j => Ioc (a j) (b j)) = ∅ := univ_pi_eq_empty hi' rw [this, integral_empty, sum_eq_zero] rintro j - rcases eq_or_ne i j with (rfl \| hne) · simp [hi] · rcases Fin.exists_succAbove_eq hne with ⟨i, rfl⟩ have : Icc (a ∘ j.succAbove) (b ∘ j.succAbove) =ᵐ[volume] (∅ : Set ℝⁿ) := by rw [ae_eq_empty, Real.volume_Icc_pi, prod_eq_zero (Finset.mem_univ i)] simp [hi] rw [setIntegral_congr_set_ae this, setIntegral_congr_set_ae this, integral_empty, integral_empty, sub_self] · -- In the non-trivial case `∀ i, a i < b i`, we apply a lemma we proved above. have hlt : ∀ i, a i < b i := fun i => (hle i).lt_of_ne fun hi => hne ⟨i, hi⟩ exact integral_divergence_of_hasFDerivWithinAt_off_countable_aux₂ ⟨a, b, hlt⟩ f f' s hs Hc Hd Hi #align measure_theory.integral_divergence_of_has_fderiv_within_at_off_countable MeasureTheory.integral_divergence_of_hasFDerivWithinAt_off_countable theorem integral_divergence_of_hasFDerivWithinAt_off_countable' (hle : a ≤ b) (f : Fin (n + 1) → ℝⁿ⁺¹ → E) (f' : Fin (n + 1) → ℝⁿ⁺¹ → ℝⁿ⁺¹ →L[ℝ] E) (s : Set ℝⁿ⁺¹) (hs : s.Countable) (Hc : ∀ i, ContinuousOn (f i) (Icc a b)) (Hd : ∀ x ∈ (pi Set.univ fun i => Ioo (a i) (b i)) \ s, ∀ (i), HasFDerivAt (f i) (f' i x) x) (Hi : IntegrableOn (fun x => ∑ i, f' i x (e i)) (Icc a b)) : (∫ x in Icc a b, ∑ i, f' i x (e i)) = ∑ i : Fin (n + 1), ((∫ x in face i, f i (frontFace i x)) - ∫ x in face i, f i (backFace i x)) := integral_divergence_of_hasFDerivWithinAt_off_countable a b hle (fun x i => f i x) (fun x => ContinuousLinearMap.pi fun i => f' i x) s hs (continuousOn_pi.2 Hc) (fun x hx => hasFDerivAt_pi.2 (Hd x hx)) Hi #align measure_theory.integral_divergence_of_has_fderiv_within_at_off_countable' MeasureTheory.integral_divergence_of_hasFDerivWithinAt_off_countable' end theorem integral_divergence_of_hasFDerivWithinAt_off_countable_of_equiv {F : Type} [NormedAddCommGroup F] [NormedSpace ℝ F] [PartialOrder F] [MeasureSpace F] [BorelSpace F] (eL : F ≃L[ℝ] ℝⁿ⁺¹) (he_ord : ∀ x y, eL x ≤ eL y ↔ x ≤ y) (he_vol : MeasurePreserving eL volume volume) (f : Fin (n + 1) → F → E) (f' : Fin (n + 1) → F → F →L[ℝ] E) (s : Set F) (hs : s.Countable) (a b : F) (hle : a ≤ b) (Hc : ∀ i, ContinuousOn (f i) (Icc a b)) (Hd : ∀ x ∈ interior (Icc a b) \ s, ∀ (i), HasFDerivAt (f i) (f' i x) x) (DF : F → E) (hDF : ∀ x, DF x = ∑ i, f' i x (eL.symm <\| e i)) (Hi : IntegrableOn DF (Icc a b)) : ∫ x in Icc a b, DF x = ∑ i : Fin (n + 1), ((∫ x in Icc (eL a ∘ i.succAbove) (eL b ∘ i.succAbove), f i (eL.symm <\| i.insertNth (eL b i) x)) - ∫ x in Icc (eL a ∘ i.succAbove) (eL b ∘ i.succAbove), f i (eL.symm <\| i.insertNth (eL a i) x)) := have he_emb : MeasurableEmbedding eL := eL.toHomeomorph.measurableEmbedding have hIcc : eL ⁻¹' Icc (eL a) (eL b) = Icc a b := by ext1 x; simp only [Set.mem_preimage, Set.mem_Icc, he_ord] have hIcc' : Icc (eL a) (eL b) = eL.symm ⁻¹' Icc a b := by rw [← hIcc, eL.symm_preimage_preimage] calc ∫ x in Icc a b, DF x = ∫ x in Icc a b, ∑ i, f' i x (eL.symm <\| e i) := by simp only [hDF] _ = ∫ x in Icc (eL a) (eL b), ∑ i, f' i (eL.symm x) (eL.symm <\| e i) := by rw [← he_vol.setIntegral_preimage_emb he_emb] simp only [hIcc, eL.symm_apply_apply] _ = ∑ i : Fin (n + 1), ((∫ x in Icc (eL a ∘ i.succAbove) (eL b ∘ i.succAbove), f i (eL.symm <\| i.insertNth (eL b i) x)) - ∫ x in Icc (eL a ∘ i.succAbove) (eL b ∘ i.succAbove), f i (eL.symm <\| i.insertNth (eL a i) x)) := by refine integral_divergence_of_hasFDerivWithinAt_off_countable' (eL a) (eL b) ((he_ord _ _).2 hle) (fun i x => f i (eL.symm x)) (fun i x => f' i (eL.symm x) ∘L (eL.symm : ℝⁿ⁺¹ →L[ℝ] F)) (eL.symm ⁻¹' s) (hs.preimage eL.symm.injective) ?_ ?_ ?_ · exact fun i => (Hc i).comp eL.symm.continuousOn hIcc'.subset · refine fun x hx i => (Hd (eL.symm x) ⟨?_, hx.2⟩ i).comp x eL.symm.hasFDerivAt rw [← hIcc] refine preimage_interior_subset_interior_preimage eL.continuous ?_ simpa only [Set.mem_preimage, eL.apply_symm_apply, ← pi_univ_Icc, interior_pi_set (@finite_univ (Fin _) _), interior_Icc] using hx.1 · rw [← he_vol.integrableOn_comp_preimage he_emb, hIcc] simp [← hDF, (· ∘ ·), Hi] #align measure_theory.integral_divergence_of_has_fderiv_within_at_off_countable_of_equiv MeasureTheory.integral_divergence_of_hasFDerivWithinAt_off_countable_of_equiv end open scoped Interval open ContinuousLinearMap (smulRight) local macro:arg t:term:max noWs "¹" : term => `(Fin 1 → $t) local macro:arg t:term:max noWs "²" : term => `(Fin 2 → $t) theorem integral_eq_of_hasDerivWithinAt_off_countable_of_le (f f' : ℝ → E) {a b : ℝ} (hle : a ≤ b) {s : Set ℝ} (hs : s.Countable) (Hc : ContinuousOn f (Icc a b)) (Hd : ∀ x ∈ Ioo a b \ s, HasDerivAt f (f' x) x) (Hi : IntervalIntegrable f' volume a b) : ∫ x in a..b, f' x = f b - f a := by set e : ℝ ≃L[ℝ] ℝ¹ := (ContinuousLinearEquiv.funUnique (Fin 1) ℝ ℝ).symm have e_symm : ∀ x, e.symm x = x 0 := fun x => rfl set F' : ℝ → ℝ →L[ℝ] E := fun x => smulRight (1 : ℝ →L[ℝ] ℝ) (f' x) have hF' : ∀ x y, F' x y = y • f' x := fun x y => rfl calc ∫ x in a..b, f' x = ∫ x in Icc a b, f' x := by rw [intervalIntegral.integral_of_le hle, setIntegral_congr_set_ae Ioc_ae_eq_Icc] _ = ∑ i : Fin 1, ((∫ x in Icc (e a ∘ i.succAbove) (e b ∘ i.succAbove), f (e.symm <\| i.insertNth (e b i) x)) - ∫ x in Icc (e a ∘ i.succAbove) (e b ∘ i.succAbove), f (e.symm <\| i.insertNth (e a i) x)) := by simp only [← interior_Icc] at Hd refine integral_divergence_of_hasFDerivWithinAt_off_countable_of_equiv e ?_ ?_ (fun _ => f) (fun _ => F') s hs a b hle (fun _ => Hc) (fun x hx _ => Hd x hx) _ ?_ ?_ · exact fun x y => (OrderIso.funUnique (Fin 1) ℝ).symm.le_iff_le · exact (volume_preserving_funUnique (Fin 1) ℝ).symm _ · intro x; rw [Fin.sum_univ_one, hF', e_symm, Pi.single_eq_same, one_smul] · rw [intervalIntegrable_iff_integrableOn_Ioc_of_le hle] at Hi exact Hi.congr_set_ae Ioc_ae_eq_Icc.symm _ = f b - f a := by simp only [e, Fin.sum_univ_one, e_symm] have : ∀ c : ℝ, const (Fin 0) c = isEmptyElim := fun c => Subsingleton.elim _ _ simp [this, volume_pi, Measure.pi_of_empty fun _ : Fin 0 => volume] #align measure_theory.integral_eq_of_has_deriv_within_at_off_countable_of_le MeasureTheory.integral_eq_of_hasDerivWithinAt_off_countable_of_le theorem integral_eq_of_hasDerivWithinAt_off_countable (f f' : ℝ → E) {a b : ℝ} {s : Set ℝ} (hs : s.Countable) (Hc : ContinuousOn f [[a, b]]) (Hd : ∀ x ∈ Ioo (min a b) (max a b) \ s, HasDerivAt f (f' x) x) (Hi : IntervalIntegrable f' volume a b) : ∫ x in a..b, f' x = f b - f a := by rcases le_total a b with hab \| hab · simp only [uIcc_of_le hab, min_eq_left hab, max_eq_right hab] at exact integral_eq_of_hasDerivWithinAt_off_countable_of_le f f' hab hs Hc Hd Hi · simp only [uIcc_of_ge hab, min_eq_right hab, max_eq_left hab] at * rw [intervalIntegral.integral_symm, neg_eq_iff_eq_neg, neg_sub] exact integral_eq_of_hasDerivWithinAt_off_countable_of_le f f' hab hs Hc Hd Hi.symm #align measure_theory.integral_eq_of_has_deriv_within_at_off_countable MeasureTheory.integral_eq_of_hasDerivWithinAt_off_countable theorem integral_divergence_prod_Icc_of_hasFDerivWithinAt_off_countable_of_le (f g : ℝ × ℝ → E) (f' g' : ℝ × ℝ → ℝ × ℝ →L[ℝ] E) (a b : ℝ × ℝ) (hle : a ≤ b) (s : Set (ℝ × ℝ)) (hs : s.Countable) (Hcf : ContinuousOn f (Icc a b)) (Hcg : ContinuousOn g (Icc a b)) (Hdf : ∀ x ∈ Ioo a.1 b.1 ×ˢ Ioo a.2 b.2 \ s, HasFDerivAt f (f' x) x) (Hdg : ∀ x ∈ Ioo a.1 b.1 ×ˢ Ioo a.2 b.2 \ s, HasFDerivAt g (g' x) x) (Hi : IntegrableOn (fun x => f' x (1, 0) + g' x (0, 1)) (Icc a b)) : (∫ x in Icc a b, f' x (1, 0) + g' x (0, 1)) = (((∫ x in a.1..b.1, g (x, b.2)) - ∫ x in a.1..b.1, g (x, a.2)) + ∫ y in a.2..b.2, f (b.1, y)) - ∫ y in a.2..b.2, f (a.1, y) := let e : (ℝ × ℝ) ≃L[ℝ] ℝ² := (ContinuousLinearEquiv.finTwoArrow ℝ ℝ).symm calc (∫ x in Icc a b, f' x (1, 0) + g' x (0, 1)) = ∑ i : Fin 2, ((∫ x in Icc (e a ∘ i.succAbove) (e b ∘ i.succAbove), ![f, g] i (e.symm <\| i.insertNth (e b i) x)) - ∫ x in Icc (e a ∘ i.succAbove) (e b ∘ i.succAbove), ![f, g] i (e.symm <\| i.insertNth (e a i) x)) := by refine integral_divergence_of_hasFDerivWithinAt_off_countable_of_equiv e ?_ ?_ ![f, g] ![f', g'] s hs a b hle ?_ (fun x hx => ?_) _ ?_ Hi · exact fun x y => (OrderIso.finTwoArrowIso ℝ).symm.le_iff_le · exact (volume_preserving_finTwoArrow ℝ).symm _ · exact Fin.forall_fin_two.2 ⟨Hcf, Hcg⟩ · rw [Icc_prod_eq, interior_prod_eq, interior_Icc, interior_Icc] at hx exact Fin.forall_fin_two.2 ⟨Hdf x hx, Hdg x hx⟩ · intro x; rw [Fin.sum_univ_two]; rfl _ = ((∫ y in Icc a.2 b.2, f (b.1, y)) - ∫ y in Icc a.2 b.2, f (a.1, y)) + ((∫ x in Icc a.1 b.1, g (x, b.2)) - ∫ x in Icc a.1 b.1, g (x, a.2)) := by have : ∀ (a b : ℝ¹) (f : ℝ¹ → E), ∫ x in Icc a b, f x = ∫ x in Icc (a 0) (b 0), f fun _ => x := fun a b f ↦ by convert (((volume_preserving_funUnique (Fin 1) ℝ).symm _).setIntegral_preimage_emb (MeasurableEquiv.measurableEmbedding _) f _).symm exact ((OrderIso.funUnique (Fin 1) ℝ).symm.preimage_Icc a b).symm simp only [Fin.sum_univ_two, this] rfl _ = (((∫ x in a.1..b.1, g (x, b.2)) - ∫ x in a.1..b.1, g (x, a.2)) + ∫ y in a.2..b.2, f (b.1, y)) - ∫ y in a.2..b.2, f (a.1, y) := by simp only [intervalIntegral.integral_of_le hle.1, intervalIntegral.integral_of_le hle.2, setIntegral_congr_set_ae (Ioc_ae_eq_Icc (α := ℝ) (μ := volume))] abel #align measure_theory.integral_divergence_prod_Icc_of_has_fderiv_within_at_off_countable_of_le MeasureTheory.integral_divergence_prod_Icc_of_hasFDerivWithinAt_off_countable_of_le	Mathlib/MeasureTheory/Integral/DivergenceTheorem.lean	492	525	theorem integral2_divergence_prod_of_hasFDerivWithinAt_off_countable (f g : ℝ × ℝ → E) (f' g' : ℝ × ℝ → ℝ × ℝ →L[ℝ] E) (a₁ a₂ b₁ b₂ : ℝ) (s : Set (ℝ × ℝ)) (hs : s.Countable) (Hcf : ContinuousOn f ([[a₁, b₁]] ×ˢ [[a₂, b₂]])) (Hcg : ContinuousOn g ([[a₁, b₁]] ×ˢ [[a₂, b₂]])) (Hdf : ∀ x ∈ Ioo (min a₁ b₁) (max a₁ b₁) ×ˢ Ioo (min a₂ b₂) (max a₂ b₂) \ s, HasFDerivAt f (f' x) x) (Hdg : ∀ x ∈ Ioo (min a₁ b₁) (max a₁ b₁) ×ˢ Ioo (min a₂ b₂) (max a₂ b₂) \ s, HasFDerivAt g (g' x) x) (Hi : IntegrableOn (fun x => f' x (1, 0) + g' x (0, 1)) ([[a₁, b₁]] ×ˢ [[a₂, b₂]])) : (∫ x in a₁..b₁, ∫ y in a₂..b₂, f' (x, y) (1, 0) + g' (x, y) (0, 1)) = (((∫ x in a₁..b₁, g (x, b₂)) - ∫ x in a₁..b₁, g (x, a₂)) + ∫ y in a₂..b₂, f (b₁, y)) - ∫ y in a₂..b₂, f (a₁, y) := by	wlog h₁ : a₁ ≤ b₁ generalizing a₁ b₁ · specialize this b₁ a₁ rw [uIcc_comm b₁ a₁, min_comm b₁ a₁, max_comm b₁ a₁] at this simp only [intervalIntegral.integral_symm b₁ a₁] refine (congr_arg Neg.neg (this Hcf Hcg Hdf Hdg Hi (le_of_not_le h₁))).trans ?_; abel wlog h₂ : a₂ ≤ b₂ generalizing a₂ b₂ · specialize this b₂ a₂ rw [uIcc_comm b₂ a₂, min_comm b₂ a₂, max_comm b₂ a₂] at this simp only [intervalIntegral.integral_symm b₂ a₂, intervalIntegral.integral_neg] refine (congr_arg Neg.neg (this Hcf Hcg Hdf Hdg Hi (le_of_not_le h₂))).trans ?_; abel simp only [uIcc_of_le h₁, uIcc_of_le h₂, min_eq_left, max_eq_right, h₁, h₂] at Hcf Hcg Hdf Hdg Hi calc (∫ x in a₁..b₁, ∫ y in a₂..b₂, f' (x, y) (1, 0) + g' (x, y) (0, 1)) = ∫ x in Icc a₁ b₁, ∫ y in Icc a₂ b₂, f' (x, y) (1, 0) + g' (x, y) (0, 1) := by simp only [intervalIntegral.integral_of_le, h₁, h₂, setIntegral_congr_set_ae (Ioc_ae_eq_Icc (α := ℝ) (μ := volume))] _ = ∫ x in Icc a₁ b₁ ×ˢ Icc a₂ b₂, f' x (1, 0) + g' x (0, 1) := (setIntegral_prod _ Hi).symm _ = (((∫ x in a₁..b₁, g (x, b₂)) - ∫ x in a₁..b₁, g (x, a₂)) + ∫ y in a₂..b₂, f (b₁, y)) - ∫ y in a₂..b₂, f (a₁, y) := by rw [Icc_prod_Icc] at * apply integral_divergence_prod_Icc_of_hasFDerivWithinAt_off_countable_of_le f g f' g' (a₁, a₂) (b₁, b₂) ⟨h₁, h₂⟩ s <;> assumption
import Mathlib.Algebra.Polynomial.Degree.Definitions import Mathlib.Algebra.Polynomial.Eval import Mathlib.Algebra.Polynomial.Monic import Mathlib.Algebra.Polynomial.RingDivision import Mathlib.Tactic.Abel #align_import ring_theory.polynomial.pochhammer from "leanprover-community/mathlib"@"53b216bcc1146df1c4a0a86877890ea9f1f01589" universe u v open Polynomial open Polynomial section Semiring variable (S : Type u) [Semiring S] noncomputable def ascPochhammer : ℕ → S[X] \| 0 => 1 \| n + 1 => X * (ascPochhammer n).comp (X + 1) #align pochhammer ascPochhammer @[simp] theorem ascPochhammer_zero : ascPochhammer S 0 = 1 := rfl #align pochhammer_zero ascPochhammer_zero @[simp] theorem ascPochhammer_one : ascPochhammer S 1 = X := by simp [ascPochhammer] #align pochhammer_one ascPochhammer_one theorem ascPochhammer_succ_left (n : ℕ) : ascPochhammer S (n + 1) = X * (ascPochhammer S n).comp (X + 1) := by rw [ascPochhammer] #align pochhammer_succ_left ascPochhammer_succ_left theorem monic_ascPochhammer (n : ℕ) [Nontrivial S] [NoZeroDivisors S] : Monic <\| ascPochhammer S n := by induction' n with n hn · simp · have : leadingCoeff (X + 1 : S[X]) = 1 := leadingCoeff_X_add_C 1 rw [ascPochhammer_succ_left, Monic.def, leadingCoeff_mul, leadingCoeff_comp (ne_zero_of_eq_one <\| natDegree_X_add_C 1 : natDegree (X + 1) ≠ 0), hn, monic_X, one_mul, one_mul, this, one_pow] section variable {S} {T : Type v} [Semiring T] @[simp] theorem ascPochhammer_map (f : S →+* T) (n : ℕ) : (ascPochhammer S n).map f = ascPochhammer T n := by induction' n with n ih · simp · simp [ih, ascPochhammer_succ_left, map_comp] #align pochhammer_map ascPochhammer_map	Mathlib/RingTheory/Polynomial/Pochhammer.lean	90	93	theorem ascPochhammer_eval₂ (f : S →+* T) (n : ℕ) (t : T) : (ascPochhammer T n).eval t = (ascPochhammer S n).eval₂ f t := by	rw [← ascPochhammer_map f] exact eval_map f t
import Mathlib.MeasureTheory.Integral.IntegrableOn import Mathlib.MeasureTheory.Integral.Bochner import Mathlib.MeasureTheory.Function.LocallyIntegrable import Mathlib.Topology.MetricSpace.ThickenedIndicator import Mathlib.Topology.ContinuousFunction.Compact import Mathlib.Analysis.NormedSpace.HahnBanach.SeparatingDual #align_import measure_theory.integral.setIntegral from "leanprover-community/mathlib"@"24e0c85412ff6adbeca08022c25ba4876eedf37a" assert_not_exists InnerProductSpace noncomputable section open Set Filter TopologicalSpace MeasureTheory Function RCLike open scoped Classical Topology ENNReal NNReal variable {X Y E F : Type} [MeasurableSpace X] namespace MeasureTheory section NormedAddCommGroup variable [NormedAddCommGroup E] [NormedSpace ℝ E] {f g : X → E} {s t : Set X} {μ ν : Measure X} {l l' : Filter X} theorem setIntegral_congr_ae₀ (hs : NullMeasurableSet s μ) (h : ∀ᵐ x ∂μ, x ∈ s → f x = g x) : ∫ x in s, f x ∂μ = ∫ x in s, g x ∂μ := integral_congr_ae ((ae_restrict_iff'₀ hs).2 h) #align measure_theory.set_integral_congr_ae₀ MeasureTheory.setIntegral_congr_ae₀ @[deprecated (since := "2024-04-17")] alias set_integral_congr_ae₀ := setIntegral_congr_ae₀ theorem setIntegral_congr_ae (hs : MeasurableSet s) (h : ∀ᵐ x ∂μ, x ∈ s → f x = g x) : ∫ x in s, f x ∂μ = ∫ x in s, g x ∂μ := integral_congr_ae ((ae_restrict_iff' hs).2 h) #align measure_theory.set_integral_congr_ae MeasureTheory.setIntegral_congr_ae @[deprecated (since := "2024-04-17")] alias set_integral_congr_ae := setIntegral_congr_ae theorem setIntegral_congr₀ (hs : NullMeasurableSet s μ) (h : EqOn f g s) : ∫ x in s, f x ∂μ = ∫ x in s, g x ∂μ := setIntegral_congr_ae₀ hs <\| eventually_of_forall h #align measure_theory.set_integral_congr₀ MeasureTheory.setIntegral_congr₀ @[deprecated (since := "2024-04-17")] alias set_integral_congr₀ := setIntegral_congr₀ theorem setIntegral_congr (hs : MeasurableSet s) (h : EqOn f g s) : ∫ x in s, f x ∂μ = ∫ x in s, g x ∂μ := setIntegral_congr_ae hs <\| eventually_of_forall h #align measure_theory.set_integral_congr MeasureTheory.setIntegral_congr @[deprecated (since := "2024-04-17")] alias set_integral_congr := setIntegral_congr theorem setIntegral_congr_set_ae (hst : s =ᵐ[μ] t) : ∫ x in s, f x ∂μ = ∫ x in t, f x ∂μ := by rw [Measure.restrict_congr_set hst] #align measure_theory.set_integral_congr_set_ae MeasureTheory.setIntegral_congr_set_ae @[deprecated (since := "2024-04-17")] alias set_integral_congr_set_ae := setIntegral_congr_set_ae theorem integral_union_ae (hst : AEDisjoint μ s t) (ht : NullMeasurableSet t μ) (hfs : IntegrableOn f s μ) (hft : IntegrableOn f t μ) : ∫ x in s ∪ t, f x ∂μ = ∫ x in s, f x ∂μ + ∫ x in t, f x ∂μ := by simp only [IntegrableOn, Measure.restrict_union₀ hst ht, integral_add_measure hfs hft] #align measure_theory.integral_union_ae MeasureTheory.integral_union_ae theorem integral_union (hst : Disjoint s t) (ht : MeasurableSet t) (hfs : IntegrableOn f s μ) (hft : IntegrableOn f t μ) : ∫ x in s ∪ t, f x ∂μ = ∫ x in s, f x ∂μ + ∫ x in t, f x ∂μ := integral_union_ae hst.aedisjoint ht.nullMeasurableSet hfs hft #align measure_theory.integral_union MeasureTheory.integral_union theorem integral_diff (ht : MeasurableSet t) (hfs : IntegrableOn f s μ) (hts : t ⊆ s) : ∫ x in s \ t, f x ∂μ = ∫ x in s, f x ∂μ - ∫ x in t, f x ∂μ := by rw [eq_sub_iff_add_eq, ← integral_union, diff_union_of_subset hts] exacts [disjoint_sdiff_self_left, ht, hfs.mono_set diff_subset, hfs.mono_set hts] #align measure_theory.integral_diff MeasureTheory.integral_diff theorem integral_inter_add_diff₀ (ht : NullMeasurableSet t μ) (hfs : IntegrableOn f s μ) : ∫ x in s ∩ t, f x ∂μ + ∫ x in s \ t, f x ∂μ = ∫ x in s, f x ∂μ := by rw [← Measure.restrict_inter_add_diff₀ s ht, integral_add_measure] · exact Integrable.mono_measure hfs (Measure.restrict_mono inter_subset_left le_rfl) · exact Integrable.mono_measure hfs (Measure.restrict_mono diff_subset le_rfl) #align measure_theory.integral_inter_add_diff₀ MeasureTheory.integral_inter_add_diff₀ theorem integral_inter_add_diff (ht : MeasurableSet t) (hfs : IntegrableOn f s μ) : ∫ x in s ∩ t, f x ∂μ + ∫ x in s \ t, f x ∂μ = ∫ x in s, f x ∂μ := integral_inter_add_diff₀ ht.nullMeasurableSet hfs #align measure_theory.integral_inter_add_diff MeasureTheory.integral_inter_add_diff theorem integral_finset_biUnion {ι : Type} (t : Finset ι) {s : ι → Set X} (hs : ∀ i ∈ t, MeasurableSet (s i)) (h's : Set.Pairwise (↑t) (Disjoint on s)) (hf : ∀ i ∈ t, IntegrableOn f (s i) μ) : ∫ x in ⋃ i ∈ t, s i, f x ∂μ = ∑ i ∈ t, ∫ x in s i, f x ∂μ := by induction' t using Finset.induction_on with a t hat IH hs h's · simp · simp only [Finset.coe_insert, Finset.forall_mem_insert, Set.pairwise_insert, Finset.set_biUnion_insert] at hs hf h's ⊢ rw [integral_union _ _ hf.1 (integrableOn_finset_iUnion.2 hf.2)] · rw [Finset.sum_insert hat, IH hs.2 h's.1 hf.2] · simp only [disjoint_iUnion_right] exact fun i hi => (h's.2 i hi (ne_of_mem_of_not_mem hi hat).symm).1 · exact Finset.measurableSet_biUnion _ hs.2 #align measure_theory.integral_finset_bUnion MeasureTheory.integral_finset_biUnion theorem integral_fintype_iUnion {ι : Type} [Fintype ι] {s : ι → Set X} (hs : ∀ i, MeasurableSet (s i)) (h's : Pairwise (Disjoint on s)) (hf : ∀ i, IntegrableOn f (s i) μ) : ∫ x in ⋃ i, s i, f x ∂μ = ∑ i, ∫ x in s i, f x ∂μ := by convert integral_finset_biUnion Finset.univ (fun i _ => hs i) _ fun i _ => hf i · simp · simp [pairwise_univ, h's] #align measure_theory.integral_fintype_Union MeasureTheory.integral_fintype_iUnion theorem integral_empty : ∫ x in ∅, f x ∂μ = 0 := by rw [Measure.restrict_empty, integral_zero_measure] #align measure_theory.integral_empty MeasureTheory.integral_empty theorem integral_univ : ∫ x in univ, f x ∂μ = ∫ x, f x ∂μ := by rw [Measure.restrict_univ] #align measure_theory.integral_univ MeasureTheory.integral_univ theorem integral_add_compl₀ (hs : NullMeasurableSet s μ) (hfi : Integrable f μ) : ∫ x in s, f x ∂μ + ∫ x in sᶜ, f x ∂μ = ∫ x, f x ∂μ := by rw [ ← integral_union_ae disjoint_compl_right.aedisjoint hs.compl hfi.integrableOn hfi.integrableOn, union_compl_self, integral_univ] #align measure_theory.integral_add_compl₀ MeasureTheory.integral_add_compl₀ theorem integral_add_compl (hs : MeasurableSet s) (hfi : Integrable f μ) : ∫ x in s, f x ∂μ + ∫ x in sᶜ, f x ∂μ = ∫ x, f x ∂μ := integral_add_compl₀ hs.nullMeasurableSet hfi #align measure_theory.integral_add_compl MeasureTheory.integral_add_compl theorem integral_indicator (hs : MeasurableSet s) : ∫ x, indicator s f x ∂μ = ∫ x in s, f x ∂μ := by by_cases hfi : IntegrableOn f s μ; swap · rw [integral_undef hfi, integral_undef] rwa [integrable_indicator_iff hs] calc ∫ x, indicator s f x ∂μ = ∫ x in s, indicator s f x ∂μ + ∫ x in sᶜ, indicator s f x ∂μ := (integral_add_compl hs (hfi.integrable_indicator hs)).symm _ = ∫ x in s, f x ∂μ + ∫ x in sᶜ, 0 ∂μ := (congr_arg₂ (· + ·) (integral_congr_ae (indicator_ae_eq_restrict hs)) (integral_congr_ae (indicator_ae_eq_restrict_compl hs))) _ = ∫ x in s, f x ∂μ := by simp #align measure_theory.integral_indicator MeasureTheory.integral_indicator theorem setIntegral_indicator (ht : MeasurableSet t) : ∫ x in s, t.indicator f x ∂μ = ∫ x in s ∩ t, f x ∂μ := by rw [integral_indicator ht, Measure.restrict_restrict ht, Set.inter_comm] #align measure_theory.set_integral_indicator MeasureTheory.setIntegral_indicator @[deprecated (since := "2024-04-17")] alias set_integral_indicator := setIntegral_indicator theorem ofReal_setIntegral_one_of_measure_ne_top {X : Type} {m : MeasurableSpace X} {μ : Measure X} {s : Set X} (hs : μ s ≠ ∞) : ENNReal.ofReal (∫ _ in s, (1 : ℝ) ∂μ) = μ s := calc ENNReal.ofReal (∫ _ in s, (1 : ℝ) ∂μ) = ENNReal.ofReal (∫ _ in s, ‖(1 : ℝ)‖ ∂μ) := by simp only [norm_one] _ = ∫⁻ _ in s, 1 ∂μ := by rw [ofReal_integral_norm_eq_lintegral_nnnorm (integrableOn_const.2 (Or.inr hs.lt_top))] simp only [nnnorm_one, ENNReal.coe_one] _ = μ s := set_lintegral_one _ #align measure_theory.of_real_set_integral_one_of_measure_ne_top MeasureTheory.ofReal_setIntegral_one_of_measure_ne_top @[deprecated (since := "2024-04-17")] alias ofReal_set_integral_one_of_measure_ne_top := ofReal_setIntegral_one_of_measure_ne_top theorem ofReal_setIntegral_one {X : Type*} {_ : MeasurableSpace X} (μ : Measure X) [IsFiniteMeasure μ] (s : Set X) : ENNReal.ofReal (∫ _ in s, (1 : ℝ) ∂μ) = μ s := ofReal_setIntegral_one_of_measure_ne_top (measure_ne_top μ s) #align measure_theory.of_real_set_integral_one MeasureTheory.ofReal_setIntegral_one @[deprecated (since := "2024-04-17")] alias ofReal_set_integral_one := ofReal_setIntegral_one	Mathlib/MeasureTheory/Integral/SetIntegral.lean	227	232	theorem integral_piecewise [DecidablePred (· ∈ s)] (hs : MeasurableSet s) (hf : IntegrableOn f s μ) (hg : IntegrableOn g sᶜ μ) : ∫ x, s.piecewise f g x ∂μ = ∫ x in s, f x ∂μ + ∫ x in sᶜ, g x ∂μ := by	rw [← Set.indicator_add_compl_eq_piecewise, integral_add' (hf.integrable_indicator hs) (hg.integrable_indicator hs.compl), integral_indicator hs, integral_indicator hs.compl]
import Mathlib.Algebra.BigOperators.Intervals import Mathlib.Topology.Algebra.InfiniteSum.Order import Mathlib.Topology.Instances.Real import Mathlib.Topology.Instances.ENNReal #align_import topology.algebra.infinite_sum.real from "leanprover-community/mathlib"@"9a59dcb7a2d06bf55da57b9030169219980660cd" open Filter Finset NNReal Topology variable {α β : Type*} [PseudoMetricSpace α] {f : ℕ → α} {a : α} theorem cauchySeq_of_dist_le_of_summable (d : ℕ → ℝ) (hf : ∀ n, dist (f n) (f n.succ) ≤ d n) (hd : Summable d) : CauchySeq f := by lift d to ℕ → ℝ≥0 using fun n ↦ dist_nonneg.trans (hf n) apply cauchySeq_of_edist_le_of_summable d (α := α) (f := f) · exact_mod_cast hf · exact_mod_cast hd #align cauchy_seq_of_dist_le_of_summable cauchySeq_of_dist_le_of_summable theorem cauchySeq_of_summable_dist (h : Summable fun n ↦ dist (f n) (f n.succ)) : CauchySeq f := cauchySeq_of_dist_le_of_summable _ (fun _ ↦ le_rfl) h #align cauchy_seq_of_summable_dist cauchySeq_of_summable_dist theorem dist_le_tsum_of_dist_le_of_tendsto (d : ℕ → ℝ) (hf : ∀ n, dist (f n) (f n.succ) ≤ d n) (hd : Summable d) {a : α} (ha : Tendsto f atTop (𝓝 a)) (n : ℕ) : dist (f n) a ≤ ∑' m, d (n + m) := by refine le_of_tendsto (tendsto_const_nhds.dist ha) (eventually_atTop.2 ⟨n, fun m hnm ↦ ?_⟩) refine le_trans (dist_le_Ico_sum_of_dist_le hnm fun _ _ ↦ hf _) ?_ rw [sum_Ico_eq_sum_range] refine sum_le_tsum (range _) (fun _ _ ↦ le_trans dist_nonneg (hf _)) ?_ exact hd.comp_injective (add_right_injective n) #align dist_le_tsum_of_dist_le_of_tendsto dist_le_tsum_of_dist_le_of_tendsto theorem dist_le_tsum_of_dist_le_of_tendsto₀ (d : ℕ → ℝ) (hf : ∀ n, dist (f n) (f n.succ) ≤ d n) (hd : Summable d) (ha : Tendsto f atTop (𝓝 a)) : dist (f 0) a ≤ tsum d := by simpa only [zero_add] using dist_le_tsum_of_dist_le_of_tendsto d hf hd ha 0 #align dist_le_tsum_of_dist_le_of_tendsto₀ dist_le_tsum_of_dist_le_of_tendsto₀ theorem dist_le_tsum_dist_of_tendsto (h : Summable fun n ↦ dist (f n) (f n.succ)) (ha : Tendsto f atTop (𝓝 a)) (n) : dist (f n) a ≤ ∑' m, dist (f (n + m)) (f (n + m).succ) := show dist (f n) a ≤ ∑' m, (fun x ↦ dist (f x) (f x.succ)) (n + m) from dist_le_tsum_of_dist_le_of_tendsto (fun n ↦ dist (f n) (f n.succ)) (fun _ ↦ le_rfl) h ha n #align dist_le_tsum_dist_of_tendsto dist_le_tsum_dist_of_tendsto theorem dist_le_tsum_dist_of_tendsto₀ (h : Summable fun n ↦ dist (f n) (f n.succ)) (ha : Tendsto f atTop (𝓝 a)) : dist (f 0) a ≤ ∑' n, dist (f n) (f n.succ) := by simpa only [zero_add] using dist_le_tsum_dist_of_tendsto h ha 0 #align dist_le_tsum_dist_of_tendsto₀ dist_le_tsum_dist_of_tendsto₀ section summable theorem not_summable_iff_tendsto_nat_atTop_of_nonneg {f : ℕ → ℝ} (hf : ∀ n, 0 ≤ f n) : ¬Summable f ↔ Tendsto (fun n : ℕ => ∑ i ∈ Finset.range n, f i) atTop atTop := by lift f to ℕ → ℝ≥0 using hf exact mod_cast NNReal.not_summable_iff_tendsto_nat_atTop #align not_summable_iff_tendsto_nat_at_top_of_nonneg not_summable_iff_tendsto_nat_atTop_of_nonneg theorem summable_iff_not_tendsto_nat_atTop_of_nonneg {f : ℕ → ℝ} (hf : ∀ n, 0 ≤ f n) : Summable f ↔ ¬Tendsto (fun n : ℕ => ∑ i ∈ Finset.range n, f i) atTop atTop := by rw [← not_iff_not, Classical.not_not, not_summable_iff_tendsto_nat_atTop_of_nonneg hf] #align summable_iff_not_tendsto_nat_at_top_of_nonneg summable_iff_not_tendsto_nat_atTop_of_nonneg	Mathlib/Topology/Algebra/InfiniteSum/Real.lean	78	81	theorem summable_sigma_of_nonneg {β : α → Type*} {f : (Σ x, β x) → ℝ} (hf : ∀ x, 0 ≤ f x) : Summable f ↔ (∀ x, Summable fun y => f ⟨x, y⟩) ∧ Summable fun x => ∑' y, f ⟨x, y⟩ := by	lift f to (Σx, β x) → ℝ≥0 using hf exact mod_cast NNReal.summable_sigma
import Mathlib.MeasureTheory.Function.SimpleFunc import Mathlib.MeasureTheory.Constructions.BorelSpace.Metrizable #align_import measure_theory.function.simple_func_dense from "leanprover-community/mathlib"@"7317149f12f55affbc900fc873d0d422485122b9" open Set Function Filter TopologicalSpace ENNReal EMetric Finset open scoped Classical open Topology ENNReal MeasureTheory variable {α β ι E F 𝕜 : Type*} noncomputable section namespace MeasureTheory local infixr:25 " →ₛ " => SimpleFunc namespace SimpleFunc variable [MeasurableSpace α] [PseudoEMetricSpace α] [OpensMeasurableSpace α] noncomputable def nearestPtInd (e : ℕ → α) : ℕ → α →ₛ ℕ \| 0 => const α 0 \| N + 1 => piecewise (⋂ k ≤ N, { x \| edist (e (N + 1)) x < edist (e k) x }) (MeasurableSet.iInter fun _ => MeasurableSet.iInter fun _ => measurableSet_lt measurable_edist_right measurable_edist_right) (const α <\| N + 1) (nearestPtInd e N) #align measure_theory.simple_func.nearest_pt_ind MeasureTheory.SimpleFunc.nearestPtInd noncomputable def nearestPt (e : ℕ → α) (N : ℕ) : α →ₛ α := (nearestPtInd e N).map e #align measure_theory.simple_func.nearest_pt MeasureTheory.SimpleFunc.nearestPt @[simp] theorem nearestPtInd_zero (e : ℕ → α) : nearestPtInd e 0 = const α 0 := rfl #align measure_theory.simple_func.nearest_pt_ind_zero MeasureTheory.SimpleFunc.nearestPtInd_zero @[simp] theorem nearestPt_zero (e : ℕ → α) : nearestPt e 0 = const α (e 0) := rfl #align measure_theory.simple_func.nearest_pt_zero MeasureTheory.SimpleFunc.nearestPt_zero	Mathlib/MeasureTheory/Function/SimpleFuncDense.lean	87	92	theorem nearestPtInd_succ (e : ℕ → α) (N : ℕ) (x : α) : nearestPtInd e (N + 1) x = if ∀ k ≤ N, edist (e (N + 1)) x < edist (e k) x then N + 1 else nearestPtInd e N x := by	simp only [nearestPtInd, coe_piecewise, Set.piecewise] congr simp
import Mathlib.Data.List.Forall2 import Mathlib.Data.Set.Pairwise.Basic import Mathlib.Init.Data.Fin.Basic #align_import data.list.nodup from "leanprover-community/mathlib"@"c227d107bbada5d0d9d20287e3282c0a7f1651a0" universe u v open Nat Function variable {α : Type u} {β : Type v} {l l₁ l₂ : List α} {r : α → α → Prop} {a b : α} namespace List @[simp] theorem forall_mem_ne {a : α} {l : List α} : (∀ a' : α, a' ∈ l → ¬a = a') ↔ a ∉ l := ⟨fun h m => h _ m rfl, fun h _ m e => h (e.symm ▸ m)⟩ #align list.forall_mem_ne List.forall_mem_ne @[simp] theorem nodup_nil : @Nodup α [] := Pairwise.nil #align list.nodup_nil List.nodup_nil @[simp] theorem nodup_cons {a : α} {l : List α} : Nodup (a :: l) ↔ a ∉ l ∧ Nodup l := by simp only [Nodup, pairwise_cons, forall_mem_ne] #align list.nodup_cons List.nodup_cons protected theorem Pairwise.nodup {l : List α} {r : α → α → Prop} [IsIrrefl α r] (h : Pairwise r l) : Nodup l := h.imp ne_of_irrefl #align list.pairwise.nodup List.Pairwise.nodup theorem rel_nodup {r : α → β → Prop} (hr : Relator.BiUnique r) : (Forall₂ r ⇒ (· ↔ ·)) Nodup Nodup \| _, _, Forall₂.nil => by simp only [nodup_nil] \| _, _, Forall₂.cons hab h => by simpa only [nodup_cons] using Relator.rel_and (Relator.rel_not (rel_mem hr hab h)) (rel_nodup hr h) #align list.rel_nodup List.rel_nodup protected theorem Nodup.cons (ha : a ∉ l) (hl : Nodup l) : Nodup (a :: l) := nodup_cons.2 ⟨ha, hl⟩ #align list.nodup.cons List.Nodup.cons theorem nodup_singleton (a : α) : Nodup [a] := pairwise_singleton _ _ #align list.nodup_singleton List.nodup_singleton theorem Nodup.of_cons (h : Nodup (a :: l)) : Nodup l := (nodup_cons.1 h).2 #align list.nodup.of_cons List.Nodup.of_cons theorem Nodup.not_mem (h : (a :: l).Nodup) : a ∉ l := (nodup_cons.1 h).1 #align list.nodup.not_mem List.Nodup.not_mem theorem not_nodup_cons_of_mem : a ∈ l → ¬Nodup (a :: l) := imp_not_comm.1 Nodup.not_mem #align list.not_nodup_cons_of_mem List.not_nodup_cons_of_mem protected theorem Nodup.sublist : l₁ <+ l₂ → Nodup l₂ → Nodup l₁ := Pairwise.sublist #align list.nodup.sublist List.Nodup.sublist theorem not_nodup_pair (a : α) : ¬Nodup [a, a] := not_nodup_cons_of_mem <\| mem_singleton_self _ #align list.not_nodup_pair List.not_nodup_pair theorem nodup_iff_sublist {l : List α} : Nodup l ↔ ∀ a, ¬[a, a] <+ l := ⟨fun d a h => not_nodup_pair a (d.sublist h), by induction' l with a l IH <;> intro h; · exact nodup_nil exact (IH fun a s => h a <\| sublist_cons_of_sublist _ s).cons fun al => h a <\| (singleton_sublist.2 al).cons_cons _⟩ #align list.nodup_iff_sublist List.nodup_iff_sublist -- Porting note (#10756): new theorem theorem nodup_iff_injective_get {l : List α} : Nodup l ↔ Function.Injective l.get := pairwise_iff_get.trans ⟨fun h i j hg => by cases' i with i hi; cases' j with j hj rcases lt_trichotomy i j with (hij \| rfl \| hji) · exact (h ⟨i, hi⟩ ⟨j, hj⟩ hij hg).elim · rfl · exact (h ⟨j, hj⟩ ⟨i, hi⟩ hji hg.symm).elim, fun hinj i j hij h => Nat.ne_of_lt hij (Fin.val_eq_of_eq (hinj h))⟩ set_option linter.deprecated false in @[deprecated nodup_iff_injective_get (since := "2023-01-10")] theorem nodup_iff_nthLe_inj {l : List α} : Nodup l ↔ ∀ i j h₁ h₂, nthLe l i h₁ = nthLe l j h₂ → i = j := nodup_iff_injective_get.trans ⟨fun hinj _ _ _ _ h => congr_arg Fin.val (hinj h), fun hinj i j h => Fin.eq_of_veq (hinj i j i.2 j.2 h)⟩ #align list.nodup_iff_nth_le_inj List.nodup_iff_nthLe_inj theorem Nodup.get_inj_iff {l : List α} (h : Nodup l) {i j : Fin l.length} : l.get i = l.get j ↔ i = j := (nodup_iff_injective_get.1 h).eq_iff set_option linter.deprecated false in @[deprecated Nodup.get_inj_iff (since := "2023-01-10")] theorem Nodup.nthLe_inj_iff {l : List α} (h : Nodup l) {i j : ℕ} (hi : i < l.length) (hj : j < l.length) : l.nthLe i hi = l.nthLe j hj ↔ i = j := ⟨nodup_iff_nthLe_inj.mp h _ _ _ _, by simp (config := { contextual := true })⟩ #align list.nodup.nth_le_inj_iff List.Nodup.nthLe_inj_iff theorem nodup_iff_get?_ne_get? {l : List α} : l.Nodup ↔ ∀ i j : ℕ, i < j → j < l.length → l.get? i ≠ l.get? j := by rw [Nodup, pairwise_iff_get] constructor · intro h i j hij hj rw [get?_eq_get (lt_trans hij hj), get?_eq_get hj, Ne, Option.some_inj] exact h _ _ hij · intro h i j hij rw [Ne, ← Option.some_inj, ← get?_eq_get, ← get?_eq_get] exact h i j hij j.2 #align list.nodup_iff_nth_ne_nth List.nodup_iff_get?_ne_get?	Mathlib/Data/List/Nodup.lean	135	146	theorem Nodup.ne_singleton_iff {l : List α} (h : Nodup l) (x : α) : l ≠ [x] ↔ l = [] ∨ ∃ y ∈ l, y ≠ x := by	induction' l with hd tl hl · simp · specialize hl h.of_cons by_cases hx : tl = [x] · simpa [hx, and_comm, and_or_left] using h · rw [← Ne, hl] at hx rcases hx with (rfl \| ⟨y, hy, hx⟩) · simp · suffices ∃ y ∈ hd :: tl, y ≠ x by simpa [ne_nil_of_mem hy] exact ⟨y, mem_cons_of_mem _ hy, hx⟩
import Mathlib.LinearAlgebra.Dimension.Constructions import Mathlib.LinearAlgebra.Dimension.Finite universe u v open Function Set Cardinal variable {R} {M M₁ M₂ M₃ : Type u} {M' : Type v} [Ring R] variable [AddCommGroup M] [AddCommGroup M₁] [AddCommGroup M₂] [AddCommGroup M₃] [AddCommGroup M'] variable [Module R M] [Module R M₁] [Module R M₂] [Module R M₃] [Module R M'] @[pp_with_univ] class HasRankNullity (R : Type v) [inst : Ring R] : Prop where exists_set_linearIndependent : ∀ (M : Type u) [AddCommGroup M] [Module R M], ∃ s : Set M, #s = Module.rank R M ∧ LinearIndependent (ι := s) R Subtype.val rank_quotient_add_rank : ∀ {M : Type u} [AddCommGroup M] [Module R M] (N : Submodule R M), Module.rank R (M ⧸ N) + Module.rank R N = Module.rank R M variable [HasRankNullity.{u} R] lemma rank_quotient_add_rank (N : Submodule R M) : Module.rank R (M ⧸ N) + Module.rank R N = Module.rank R M := HasRankNullity.rank_quotient_add_rank N #align rank_quotient_add_rank rank_quotient_add_rank variable (R M) in lemma exists_set_linearIndependent : ∃ s : Set M, #s = Module.rank R M ∧ LinearIndependent (ι := s) R Subtype.val := HasRankNullity.exists_set_linearIndependent M variable (R) in instance (priority := 100) : Nontrivial R := by refine (subsingleton_or_nontrivial R).resolve_left fun H ↦ ?_ have := rank_quotient_add_rank (R := R) (M := PUnit) ⊥ simp [one_add_one_eq_two] at this theorem lift_rank_range_add_rank_ker (f : M →ₗ[R] M') : lift.{u} (Module.rank R (LinearMap.range f)) + lift.{v} (Module.rank R (LinearMap.ker f)) = lift.{v} (Module.rank R M) := by haveI := fun p : Submodule R M => Classical.decEq (M ⧸ p) rw [← f.quotKerEquivRange.lift_rank_eq, ← lift_add, rank_quotient_add_rank] theorem rank_range_add_rank_ker (f : M →ₗ[R] M₁) : Module.rank R (LinearMap.range f) + Module.rank R (LinearMap.ker f) = Module.rank R M := by haveI := fun p : Submodule R M => Classical.decEq (M ⧸ p) rw [← f.quotKerEquivRange.rank_eq, rank_quotient_add_rank] #align rank_range_add_rank_ker rank_range_add_rank_ker theorem lift_rank_eq_of_surjective {f : M →ₗ[R] M'} (h : Surjective f) : lift.{v} (Module.rank R M) = lift.{u} (Module.rank R M') + lift.{v} (Module.rank R (LinearMap.ker f)) := by rw [← lift_rank_range_add_rank_ker f, ← rank_range_of_surjective f h]	Mathlib/LinearAlgebra/Dimension/RankNullity.lean	86	88	theorem rank_eq_of_surjective {f : M →ₗ[R] M₁} (h : Surjective f) : Module.rank R M = Module.rank R M₁ + Module.rank R (LinearMap.ker f) := by	rw [← rank_range_add_rank_ker f, ← rank_range_of_surjective f h]
import Mathlib.Data.Finset.Lattice import Mathlib.Data.Set.Sigma #align_import data.finset.sigma from "leanprover-community/mathlib"@"9003f28797c0664a49e4179487267c494477d853" open Function Multiset variable {ι : Type} namespace Finset section Sigma variable {α : ι → Type} {β : Type*} (s s₁ s₂ : Finset ι) (t t₁ t₂ : ∀ i, Finset (α i)) protected def sigma : Finset (Σi, α i) := ⟨_, s.nodup.sigma fun i => (t i).nodup⟩ #align finset.sigma Finset.sigma variable {s s₁ s₂ t t₁ t₂} @[simp] theorem mem_sigma {a : Σi, α i} : a ∈ s.sigma t ↔ a.1 ∈ s ∧ a.2 ∈ t a.1 := Multiset.mem_sigma #align finset.mem_sigma Finset.mem_sigma @[simp, norm_cast] theorem coe_sigma (s : Finset ι) (t : ∀ i, Finset (α i)) : (s.sigma t : Set (Σ i, α i)) = (s : Set ι).sigma fun i ↦ (t i : Set (α i)) := Set.ext fun _ => mem_sigma #align finset.coe_sigma Finset.coe_sigma @[simp, aesop safe apply (rule_sets := [finsetNonempty])] theorem sigma_nonempty : (s.sigma t).Nonempty ↔ ∃ i ∈ s, (t i).Nonempty := by simp [Finset.Nonempty] #align finset.sigma_nonempty Finset.sigma_nonempty @[simp] theorem sigma_eq_empty : s.sigma t = ∅ ↔ ∀ i ∈ s, t i = ∅ := by simp only [← not_nonempty_iff_eq_empty, sigma_nonempty, not_exists, not_and] #align finset.sigma_eq_empty Finset.sigma_eq_empty @[mono] theorem sigma_mono (hs : s₁ ⊆ s₂) (ht : ∀ i, t₁ i ⊆ t₂ i) : s₁.sigma t₁ ⊆ s₂.sigma t₂ := fun ⟨i, _⟩ h => let ⟨hi, ha⟩ := mem_sigma.1 h mem_sigma.2 ⟨hs hi, ht i ha⟩ #align finset.sigma_mono Finset.sigma_mono	Mathlib/Data/Finset/Sigma.lean	75	81	theorem pairwiseDisjoint_map_sigmaMk : (s : Set ι).PairwiseDisjoint fun i => (t i).map (Embedding.sigmaMk i) := by	intro i _ j _ hij rw [Function.onFun, disjoint_left] simp_rw [mem_map, Function.Embedding.sigmaMk_apply] rintro _ ⟨y, _, rfl⟩ ⟨z, _, hz'⟩ exact hij (congr_arg Sigma.fst hz'.symm)
import Mathlib.Tactic.CategoryTheory.Elementwise import Mathlib.CategoryTheory.Limits.Shapes.Multiequalizer import Mathlib.CategoryTheory.Limits.Constructions.EpiMono import Mathlib.CategoryTheory.Limits.Preserves.Limits import Mathlib.CategoryTheory.Limits.Shapes.Types #align_import category_theory.glue_data from "leanprover-community/mathlib"@"14b69e9f3c16630440a2cbd46f1ddad0d561dee7" noncomputable section open CategoryTheory.Limits namespace CategoryTheory universe v u₁ u₂ variable (C : Type u₁) [Category.{v} C] {C' : Type u₂} [Category.{v} C'] -- Porting note(#5171): linter not ported yet -- @[nolint has_nonempty_instance] structure GlueData where J : Type v U : J → C V : J × J → C f : ∀ i j, V (i, j) ⟶ U i f_mono : ∀ i j, Mono (f i j) := by infer_instance f_hasPullback : ∀ i j k, HasPullback (f i j) (f i k) := by infer_instance f_id : ∀ i, IsIso (f i i) := by infer_instance t : ∀ i j, V (i, j) ⟶ V (j, i) t_id : ∀ i, t i i = 𝟙 _ t' : ∀ i j k, pullback (f i j) (f i k) ⟶ pullback (f j k) (f j i) t_fac : ∀ i j k, t' i j k ≫ pullback.snd = pullback.fst ≫ t i j cocycle : ∀ i j k, t' i j k ≫ t' j k i ≫ t' k i j = 𝟙 _ #align category_theory.glue_data CategoryTheory.GlueData attribute [simp] GlueData.t_id attribute [instance] GlueData.f_id GlueData.f_mono GlueData.f_hasPullback attribute [reassoc] GlueData.t_fac GlueData.cocycle namespace GlueData variable {C} variable (D : GlueData C) @[simp]	Mathlib/CategoryTheory/GlueData.lean	77	85	theorem t'_iij (i j : D.J) : D.t' i i j = (pullbackSymmetry _ _).hom := by	have eq₁ := D.t_fac i i j have eq₂ := (IsIso.eq_comp_inv (D.f i i)).mpr (@pullback.condition _ _ _ _ _ _ (D.f i j) _) rw [D.t_id, Category.comp_id, eq₂] at eq₁ have eq₃ := (IsIso.eq_comp_inv (D.f i i)).mp eq₁ rw [Category.assoc, ← pullback.condition, ← Category.assoc] at eq₃ exact Mono.right_cancellation _ _ ((Mono.right_cancellation _ _ eq₃).trans (pullbackSymmetry_hom_comp_fst _ _).symm)
import Mathlib.Analysis.Convex.Between import Mathlib.Analysis.Normed.Group.AddTorsor import Mathlib.Geometry.Euclidean.Angle.Unoriented.Basic import Mathlib.Analysis.NormedSpace.AffineIsometry #align_import geometry.euclidean.angle.unoriented.affine from "leanprover-community/mathlib"@"46b633fd842bef9469441c0209906f6dddd2b4f5" noncomputable section open Real RealInnerProductSpace namespace EuclideanGeometry open InnerProductGeometry variable {V P : Type} [NormedAddCommGroup V] [InnerProductSpace ℝ V] [MetricSpace P] [NormedAddTorsor V P] {p p₀ p₁ p₂ : P} nonrec def angle (p1 p2 p3 : P) : ℝ := angle (p1 -ᵥ p2 : V) (p3 -ᵥ p2) #align euclidean_geometry.angle EuclideanGeometry.angle @[inherit_doc] scoped notation "∠" => EuclideanGeometry.angle theorem continuousAt_angle {x : P × P × P} (hx12 : x.1 ≠ x.2.1) (hx32 : x.2.2 ≠ x.2.1) : ContinuousAt (fun y : P × P × P => ∠ y.1 y.2.1 y.2.2) x := by let f : P × P × P → V × V := fun y => (y.1 -ᵥ y.2.1, y.2.2 -ᵥ y.2.1) have hf1 : (f x).1 ≠ 0 := by simp [hx12] have hf2 : (f x).2 ≠ 0 := by simp [hx32] exact (InnerProductGeometry.continuousAt_angle hf1 hf2).comp ((continuous_fst.vsub continuous_snd.fst).prod_mk (continuous_snd.snd.vsub continuous_snd.fst)).continuousAt #align euclidean_geometry.continuous_at_angle EuclideanGeometry.continuousAt_angle @[simp] theorem _root_.AffineIsometry.angle_map {V₂ P₂ : Type} [NormedAddCommGroup V₂] [InnerProductSpace ℝ V₂] [MetricSpace P₂] [NormedAddTorsor V₂ P₂] (f : P →ᵃⁱ[ℝ] P₂) (p₁ p₂ p₃ : P) : ∠ (f p₁) (f p₂) (f p₃) = ∠ p₁ p₂ p₃ := by simp_rw [angle, ← AffineIsometry.map_vsub, LinearIsometry.angle_map] #align affine_isometry.angle_map AffineIsometry.angle_map @[simp, norm_cast] theorem _root_.AffineSubspace.angle_coe {s : AffineSubspace ℝ P} (p₁ p₂ p₃ : s) : haveI : Nonempty s := ⟨p₁⟩ ∠ (p₁ : P) (p₂ : P) (p₃ : P) = ∠ p₁ p₂ p₃ := haveI : Nonempty s := ⟨p₁⟩ s.subtypeₐᵢ.angle_map p₁ p₂ p₃ #align affine_subspace.angle_coe AffineSubspace.angle_coe @[simp] theorem angle_const_vadd (v : V) (p₁ p₂ p₃ : P) : ∠ (v +ᵥ p₁) (v +ᵥ p₂) (v +ᵥ p₃) = ∠ p₁ p₂ p₃ := (AffineIsometryEquiv.constVAdd ℝ P v).toAffineIsometry.angle_map _ _ _ #align euclidean_geometry.angle_const_vadd EuclideanGeometry.angle_const_vadd @[simp] theorem angle_vadd_const (v₁ v₂ v₃ : V) (p : P) : ∠ (v₁ +ᵥ p) (v₂ +ᵥ p) (v₃ +ᵥ p) = ∠ v₁ v₂ v₃ := (AffineIsometryEquiv.vaddConst ℝ p).toAffineIsometry.angle_map _ _ _ #align euclidean_geometry.angle_vadd_const EuclideanGeometry.angle_vadd_const @[simp] theorem angle_const_vsub (p p₁ p₂ p₃ : P) : ∠ (p -ᵥ p₁) (p -ᵥ p₂) (p -ᵥ p₃) = ∠ p₁ p₂ p₃ := (AffineIsometryEquiv.constVSub ℝ p).toAffineIsometry.angle_map _ _ _ #align euclidean_geometry.angle_const_vsub EuclideanGeometry.angle_const_vsub @[simp] theorem angle_vsub_const (p₁ p₂ p₃ p : P) : ∠ (p₁ -ᵥ p) (p₂ -ᵥ p) (p₃ -ᵥ p) = ∠ p₁ p₂ p₃ := (AffineIsometryEquiv.vaddConst ℝ p).symm.toAffineIsometry.angle_map _ _ _ #align euclidean_geometry.angle_vsub_const EuclideanGeometry.angle_vsub_const @[simp] theorem angle_add_const (v₁ v₂ v₃ : V) (v : V) : ∠ (v₁ + v) (v₂ + v) (v₃ + v) = ∠ v₁ v₂ v₃ := angle_vadd_const _ _ _ _ #align euclidean_geometry.angle_add_const EuclideanGeometry.angle_add_const @[simp] theorem angle_const_add (v : V) (v₁ v₂ v₃ : V) : ∠ (v + v₁) (v + v₂) (v + v₃) = ∠ v₁ v₂ v₃ := angle_const_vadd _ _ _ _ #align euclidean_geometry.angle_const_add EuclideanGeometry.angle_const_add @[simp] theorem angle_sub_const (v₁ v₂ v₃ : V) (v : V) : ∠ (v₁ - v) (v₂ - v) (v₃ - v) = ∠ v₁ v₂ v₃ := by simpa only [vsub_eq_sub] using angle_vsub_const v₁ v₂ v₃ v #align euclidean_geometry.angle_sub_const EuclideanGeometry.angle_sub_const @[simp] theorem angle_const_sub (v : V) (v₁ v₂ v₃ : V) : ∠ (v - v₁) (v - v₂) (v - v₃) = ∠ v₁ v₂ v₃ := by simpa only [vsub_eq_sub] using angle_const_vsub v v₁ v₂ v₃ #align euclidean_geometry.angle_const_sub EuclideanGeometry.angle_const_sub @[simp]	Mathlib/Geometry/Euclidean/Angle/Unoriented/Affine.lean	125	126	theorem angle_neg (v₁ v₂ v₃ : V) : ∠ (-v₁) (-v₂) (-v₃) = ∠ v₁ v₂ v₃ := by	simpa only [zero_sub] using angle_const_sub 0 v₁ v₂ v₃
import Mathlib.LinearAlgebra.CliffordAlgebra.Contraction variable {R M : Type*} variable [CommRing R] [AddCommGroup M] [Module R M] {Q : QuadraticForm R M} namespace CliffordAlgebra variable (Q) def invertibleιOfInvertible (m : M) [Invertible (Q m)] : Invertible (ι Q m) where invOf := ι Q (⅟ (Q m) • m) invOf_mul_self := by rw [map_smul, smul_mul_assoc, ι_sq_scalar, Algebra.smul_def, ← map_mul, invOf_mul_self, map_one] mul_invOf_self := by rw [map_smul, mul_smul_comm, ι_sq_scalar, Algebra.smul_def, ← map_mul, invOf_mul_self, map_one] #align clifford_algebra.invertible_ι_of_invertible CliffordAlgebra.invertibleιOfInvertible theorem invOf_ι (m : M) [Invertible (Q m)] [Invertible (ι Q m)] : ⅟ (ι Q m) = ι Q (⅟ (Q m) • m) := by letI := invertibleιOfInvertible Q m convert (rfl : ⅟ (ι Q m) = _) #align clifford_algebra.inv_of_ι CliffordAlgebra.invOf_ι theorem isUnit_ι_of_isUnit {m : M} (h : IsUnit (Q m)) : IsUnit (ι Q m) := by cases h.nonempty_invertible letI := invertibleιOfInvertible Q m exact isUnit_of_invertible (ι Q m) #align clifford_algebra.is_unit_ι_of_is_unit CliffordAlgebra.isUnit_ι_of_isUnit	Mathlib/LinearAlgebra/CliffordAlgebra/Inversion.lean	44	47	theorem ι_mul_ι_mul_invOf_ι (a b : M) [Invertible (ι Q a)] [Invertible (Q a)] : ι Q a * ι Q b * ⅟ (ι Q a) = ι Q ((⅟ (Q a) * QuadraticForm.polar Q a b) • a - b) := by	rw [invOf_ι, map_smul, mul_smul_comm, ι_mul_ι_mul_ι, ← map_smul, smul_sub, smul_smul, smul_smul, invOf_mul_self, one_smul]
import Mathlib.Analysis.Calculus.FDeriv.Add import Mathlib.Analysis.Calculus.FDeriv.Equiv import Mathlib.Analysis.Calculus.FDeriv.Prod import Mathlib.Analysis.Calculus.Monotone import Mathlib.Data.Set.Function import Mathlib.Algebra.Group.Basic import Mathlib.Tactic.WLOG #align_import analysis.bounded_variation from "leanprover-community/mathlib"@"3bce8d800a6f2b8f63fe1e588fd76a9ff4adcebe" open scoped NNReal ENNReal Topology UniformConvergence open Set MeasureTheory Filter -- Porting note: sectioned variables because a `wlog` was broken due to extra variables in context variable {α : Type} [LinearOrder α] {E : Type} [PseudoEMetricSpace E] noncomputable def eVariationOn (f : α → E) (s : Set α) : ℝ≥0∞ := ⨆ p : ℕ × { u : ℕ → α // Monotone u ∧ ∀ i, u i ∈ s }, ∑ i ∈ Finset.range p.1, edist (f (p.2.1 (i + 1))) (f (p.2.1 i)) #align evariation_on eVariationOn def BoundedVariationOn (f : α → E) (s : Set α) := eVariationOn f s ≠ ∞ #align has_bounded_variation_on BoundedVariationOn def LocallyBoundedVariationOn (f : α → E) (s : Set α) := ∀ a b, a ∈ s → b ∈ s → BoundedVariationOn f (s ∩ Icc a b) #align has_locally_bounded_variation_on LocallyBoundedVariationOn namespace eVariationOn	Mathlib/Analysis/BoundedVariation.lean	83	86	theorem nonempty_monotone_mem {s : Set α} (hs : s.Nonempty) : Nonempty { u // Monotone u ∧ ∀ i : ℕ, u i ∈ s } := by	obtain ⟨x, hx⟩ := hs exact ⟨⟨fun _ => x, fun i j _ => le_rfl, fun _ => hx⟩⟩
import Mathlib.Topology.Defs.Sequences import Mathlib.Topology.UniformSpace.Cauchy #align_import topology.sequences from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982" open Set Function Filter TopologicalSpace Bornology open scoped Topology Uniformity variable {X Y : Type*} section TopologicalSpace variable [TopologicalSpace X] [TopologicalSpace Y] theorem subset_seqClosure {s : Set X} : s ⊆ seqClosure s := fun p hp => ⟨const ℕ p, fun _ => hp, tendsto_const_nhds⟩ #align subset_seq_closure subset_seqClosure theorem seqClosure_subset_closure {s : Set X} : seqClosure s ⊆ closure s := fun _p ⟨_x, xM, xp⟩ => mem_closure_of_tendsto xp (univ_mem' xM) #align seq_closure_subset_closure seqClosure_subset_closure theorem IsSeqClosed.seqClosure_eq {s : Set X} (hs : IsSeqClosed s) : seqClosure s = s := Subset.antisymm (fun _p ⟨_x, hx, hp⟩ => hs hx hp) subset_seqClosure #align is_seq_closed.seq_closure_eq IsSeqClosed.seqClosure_eq theorem isSeqClosed_of_seqClosure_eq {s : Set X} (hs : seqClosure s = s) : IsSeqClosed s := fun x _p hxs hxp => hs ▸ ⟨x, hxs, hxp⟩ #align is_seq_closed_of_seq_closure_eq isSeqClosed_of_seqClosure_eq theorem isSeqClosed_iff {s : Set X} : IsSeqClosed s ↔ seqClosure s = s := ⟨IsSeqClosed.seqClosure_eq, isSeqClosed_of_seqClosure_eq⟩ #align is_seq_closed_iff isSeqClosed_iff protected theorem IsClosed.isSeqClosed {s : Set X} (hc : IsClosed s) : IsSeqClosed s := fun _u _x hu hx => hc.mem_of_tendsto hx (eventually_of_forall hu) #align is_closed.is_seq_closed IsClosed.isSeqClosed theorem seqClosure_eq_closure [FrechetUrysohnSpace X] (s : Set X) : seqClosure s = closure s := seqClosure_subset_closure.antisymm <\| FrechetUrysohnSpace.closure_subset_seqClosure s #align seq_closure_eq_closure seqClosure_eq_closure theorem mem_closure_iff_seq_limit [FrechetUrysohnSpace X] {s : Set X} {a : X} : a ∈ closure s ↔ ∃ x : ℕ → X, (∀ n : ℕ, x n ∈ s) ∧ Tendsto x atTop (𝓝 a) := by rw [← seqClosure_eq_closure] rfl #align mem_closure_iff_seq_limit mem_closure_iff_seq_limit theorem tendsto_nhds_iff_seq_tendsto [FrechetUrysohnSpace X] {f : X → Y} {a : X} {b : Y} : Tendsto f (𝓝 a) (𝓝 b) ↔ ∀ u : ℕ → X, Tendsto u atTop (𝓝 a) → Tendsto (f ∘ u) atTop (𝓝 b) := by refine ⟨fun hf u hu => hf.comp hu, fun h => ((nhds_basis_closeds _).tendsto_iff (nhds_basis_closeds _)).2 ?_⟩ rintro s ⟨hbs, hsc⟩ refine ⟨closure (f ⁻¹' s), ⟨mt ?_ hbs, isClosed_closure⟩, fun x => mt fun hx => subset_closure hx⟩ rw [← seqClosure_eq_closure] rintro ⟨u, hus, hu⟩ exact hsc.mem_of_tendsto (h u hu) (eventually_of_forall hus) #align tendsto_nhds_iff_seq_tendsto tendsto_nhds_iff_seq_tendsto	Mathlib/Topology/Sequences.lean	139	151	theorem FrechetUrysohnSpace.of_seq_tendsto_imp_tendsto (h : ∀ (f : X → Prop) (a : X), (∀ u : ℕ → X, Tendsto u atTop (𝓝 a) → Tendsto (f ∘ u) atTop (𝓝 (f a))) → ContinuousAt f a) : FrechetUrysohnSpace X := by	refine ⟨fun s x hcx => ?_⟩ by_cases hx : x ∈ s; · exact subset_seqClosure hx · obtain ⟨u, hux, hus⟩ : ∃ u : ℕ → X, Tendsto u atTop (𝓝 x) ∧ ∃ᶠ x in atTop, u x ∈ s := by simpa only [ContinuousAt, hx, tendsto_nhds_true, (· ∘ ·), ← not_frequently, exists_prop, ← mem_closure_iff_frequently, hcx, imp_false, not_forall, not_not, not_false_eq_true, not_true_eq_false] using h (· ∉ s) x rcases extraction_of_frequently_atTop hus with ⟨φ, φ_mono, hφ⟩ exact ⟨u ∘ φ, hφ, hux.comp φ_mono.tendsto_atTop⟩
import Mathlib.Analysis.SpecialFunctions.ExpDeriv import Mathlib.Analysis.SpecialFunctions.Complex.Circle import Mathlib.Analysis.InnerProductSpace.l2Space import Mathlib.MeasureTheory.Function.ContinuousMapDense import Mathlib.MeasureTheory.Function.L2Space import Mathlib.MeasureTheory.Group.Integral import Mathlib.MeasureTheory.Integral.Periodic import Mathlib.Topology.ContinuousFunction.StoneWeierstrass import Mathlib.MeasureTheory.Integral.FundThmCalculus #align_import analysis.fourier.add_circle from "leanprover-community/mathlib"@"8f9fea08977f7e450770933ee6abb20733b47c92" noncomputable section open scoped ENNReal ComplexConjugate Real open TopologicalSpace ContinuousMap MeasureTheory MeasureTheory.Measure Algebra Submodule Set variable {T : ℝ} open AddCircle section Monomials def fourier (n : ℤ) : C(AddCircle T, ℂ) where toFun x := toCircle (n • x :) continuous_toFun := continuous_induced_dom.comp <\| continuous_toCircle.comp <\| continuous_zsmul _ #align fourier fourier @[simp] theorem fourier_apply {n : ℤ} {x : AddCircle T} : fourier n x = toCircle (n • x :) := rfl #align fourier_apply fourier_apply -- @[simp] -- Porting note: simp normal form is `fourier_coe_apply'` theorem fourier_coe_apply {n : ℤ} {x : ℝ} : fourier n (x : AddCircle T) = Complex.exp (2 * π * Complex.I * n * x / T) := by rw [fourier_apply, ← QuotientAddGroup.mk_zsmul, toCircle, Function.Periodic.lift_coe, expMapCircle_apply, Complex.ofReal_mul, Complex.ofReal_div, Complex.ofReal_mul, zsmul_eq_mul, Complex.ofReal_mul, Complex.ofReal_intCast] norm_num congr 1; ring #align fourier_coe_apply fourier_coe_apply @[simp] theorem fourier_coe_apply' {n : ℤ} {x : ℝ} : toCircle (n • (x : AddCircle T) :) = Complex.exp (2 * π * Complex.I * n * x / T) := by rw [← fourier_apply]; exact fourier_coe_apply -- @[simp] -- Porting note: simp normal form is `fourier_zero'` theorem fourier_zero {x : AddCircle T} : fourier 0 x = 1 := by induction x using QuotientAddGroup.induction_on' simp only [fourier_coe_apply] norm_num #align fourier_zero fourier_zero @[simp] theorem fourier_zero' {x : AddCircle T} : @toCircle T 0 = (1 : ℂ) := by have : fourier 0 x = @toCircle T 0 := by rw [fourier_apply, zero_smul] rw [← this]; exact fourier_zero -- @[simp] -- Porting note: simp normal form is also `fourier_zero'`	Mathlib/Analysis/Fourier/AddCircle.lean	144	146	theorem fourier_eval_zero (n : ℤ) : fourier n (0 : AddCircle T) = 1 := by	rw [← QuotientAddGroup.mk_zero, fourier_coe_apply, Complex.ofReal_zero, mul_zero, zero_div, Complex.exp_zero]
import Mathlib.Data.Sigma.Basic import Mathlib.Algebra.Order.Ring.Nat #align_import set_theory.lists from "leanprover-community/mathlib"@"497d1e06409995dd8ec95301fa8d8f3480187f4c" variable {α : Type} inductive Lists'.{u} (α : Type u) : Bool → Type u \| atom : α → Lists' α false \| nil : Lists' α true \| cons' {b} : Lists' α b → Lists' α true → Lists' α true deriving DecidableEq #align lists' Lists' compile_inductive% Lists' def Lists (α : Type) := Σb, Lists' α b #align lists Lists namespace Lists' instance [Inhabited α] : ∀ b, Inhabited (Lists' α b) \| true => ⟨nil⟩ \| false => ⟨atom default⟩ def cons : Lists α → Lists' α true → Lists' α true \| ⟨_, a⟩, l => cons' a l #align lists'.cons Lists'.cons @[simp] def toList : ∀ {b}, Lists' α b → List (Lists α) \| _, atom _ => [] \| _, nil => [] \| _, cons' a l => ⟨_, a⟩ :: l.toList #align lists'.to_list Lists'.toList -- Porting note (#10618): removed @[simp] -- simp can prove this: by simp only [@Lists'.toList, @Sigma.eta] theorem toList_cons (a : Lists α) (l) : toList (cons a l) = a :: l.toList := by simp #align lists'.to_list_cons Lists'.toList_cons @[simp] def ofList : List (Lists α) → Lists' α true \| [] => nil \| a :: l => cons a (ofList l) #align lists'.of_list Lists'.ofList @[simp] theorem to_ofList (l : List (Lists α)) : toList (ofList l) = l := by induction l <;> simp [*] #align lists'.to_of_list Lists'.to_ofList @[simp]	Mathlib/SetTheory/Lists.lean	103	120	theorem of_toList : ∀ l : Lists' α true, ofList (toList l) = l := suffices ∀ (b) (h : true = b) (l : Lists' α b), let l' : Lists' α true := by	rw [h]; exact l ofList (toList l') = l' from this _ rfl fun b h l => by induction l with \| atom => cases h -- Porting note: case nil was not covered. \| nil => simp \| cons' b a _ IH => intro l' -- Porting note: Previous code was: -- change l' with cons' a l -- -- This can be removed. simpa [cons, l'] using IH rfl
import Mathlib.LinearAlgebra.FiniteDimensional import Mathlib.LinearAlgebra.Matrix.GeneralLinearGroup import Mathlib.LinearAlgebra.Matrix.Nondegenerate import Mathlib.LinearAlgebra.Matrix.NonsingularInverse import Mathlib.LinearAlgebra.Matrix.ToLin import Mathlib.RingTheory.Localization.FractionRing import Mathlib.RingTheory.Localization.Integer #align_import linear_algebra.matrix.to_linear_equiv from "leanprover-community/mathlib"@"e42cfdb03b7902f8787a1eb552cb8f77766b45b9" variable {n : Type} [Fintype n] namespace Matrix section LinearEquiv open LinearMap variable {R M : Type} [CommRing R] [AddCommGroup M] [Module R M] section Nondegenerate open Matrix theorem exists_mulVec_eq_zero_iff_aux {K : Type} [DecidableEq n] [Field K] {M : Matrix n n K} : (∃ v ≠ 0, M ᵥ v = 0) ↔ M.det = 0 := by constructor · rintro ⟨v, hv, mul_eq⟩ contrapose! hv exact eq_zero_of_mulVec_eq_zero hv mul_eq · contrapose! intro h have : Function.Injective (Matrix.toLin' M) := by simpa only [← LinearMap.ker_eq_bot, ker_toLin'_eq_bot_iff, not_imp_not] using h have : M * LinearMap.toMatrix' ((LinearEquiv.ofInjectiveEndo (Matrix.toLin' M) this).symm : (n → K) →ₗ[K] n → K) = 1 := by refine Matrix.toLin'.injective (LinearMap.ext fun v => ?_) rw [Matrix.toLin'_mul, Matrix.toLin'_one, Matrix.toLin'_toMatrix', LinearMap.comp_apply] exact (LinearEquiv.ofInjectiveEndo (Matrix.toLin' M) this).apply_symm_apply v exact Matrix.det_ne_zero_of_right_inverse this #align matrix.exists_mul_vec_eq_zero_iff_aux Matrix.exists_mulVec_eq_zero_iff_aux theorem exists_mulVec_eq_zero_iff' {A : Type} (K : Type) [DecidableEq n] [CommRing A] [Nontrivial A] [Field K] [Algebra A K] [IsFractionRing A K] {M : Matrix n n A} : (∃ v ≠ 0, M ᵥ v = 0) ↔ M.det = 0 := by have : (∃ v ≠ 0, (algebraMap A K).mapMatrix M ᵥ v = 0) ↔ _ := exists_mulVec_eq_zero_iff_aux rw [← RingHom.map_det, IsFractionRing.to_map_eq_zero_iff] at this refine Iff.trans ?_ this; constructor <;> rintro ⟨v, hv, mul_eq⟩ · refine ⟨fun i => algebraMap _ _ (v i), mt (fun h => funext fun i => ?_) hv, ?_⟩ · exact IsFractionRing.to_map_eq_zero_iff.mp (congr_fun h i) · ext i refine (RingHom.map_mulVec _ _ _ i).symm.trans ?_ rw [mul_eq, Pi.zero_apply, RingHom.map_zero, Pi.zero_apply] · letI := Classical.decEq K obtain ⟨⟨b, hb⟩, ba_eq⟩ := IsLocalization.exist_integer_multiples_of_finset (nonZeroDivisors A) (Finset.univ.image v) choose f hf using ba_eq refine ⟨fun i => f _ (Finset.mem_image.mpr ⟨i, Finset.mem_univ i, rfl⟩), mt (fun h => funext fun i => ?_) hv, ?_⟩ · have := congr_arg (algebraMap A K) (congr_fun h i) rw [hf, Subtype.coe_mk, Pi.zero_apply, RingHom.map_zero, Algebra.smul_def, mul_eq_zero, IsFractionRing.to_map_eq_zero_iff] at this exact this.resolve_left (nonZeroDivisors.ne_zero hb) · ext i refine IsFractionRing.injective A K ?_ calc algebraMap A K ((M ᵥ (fun i : n => f (v i) _)) i) = ((algebraMap A K).mapMatrix M ᵥ algebraMap _ K b • v) i := ?_ _ = 0 := ?_ _ = algebraMap A K 0 := (RingHom.map_zero _).symm · simp_rw [RingHom.map_mulVec, mulVec, dotProduct, Function.comp_apply, hf, RingHom.mapMatrix_apply, Pi.smul_apply, smul_eq_mul, Algebra.smul_def] · rw [mulVec_smul, mul_eq, Pi.smul_apply, Pi.zero_apply, smul_zero] #align matrix.exists_mul_vec_eq_zero_iff' Matrix.exists_mulVec_eq_zero_iff' theorem exists_mulVec_eq_zero_iff {A : Type} [DecidableEq n] [CommRing A] [IsDomain A] {M : Matrix n n A} : (∃ v ≠ 0, M ᵥ v = 0) ↔ M.det = 0 := exists_mulVec_eq_zero_iff' (FractionRing A) #align matrix.exists_mul_vec_eq_zero_iff Matrix.exists_mulVec_eq_zero_iff theorem exists_vecMul_eq_zero_iff {A : Type} [DecidableEq n] [CommRing A] [IsDomain A] {M : Matrix n n A} : (∃ v ≠ 0, v ᵥ M = 0) ↔ M.det = 0 := by simpa only [← M.det_transpose, ← mulVec_transpose] using exists_mulVec_eq_zero_iff #align matrix.exists_vec_mul_eq_zero_iff Matrix.exists_vecMul_eq_zero_iff	Mathlib/LinearAlgebra/Matrix/ToLinearEquiv.lean	180	190	theorem nondegenerate_iff_det_ne_zero {A : Type*} [DecidableEq n] [CommRing A] [IsDomain A] {M : Matrix n n A} : Nondegenerate M ↔ M.det ≠ 0 := by	rw [ne_eq, ← exists_vecMul_eq_zero_iff] push_neg constructor · intro hM v hv hMv obtain ⟨w, hwMv⟩ := hM.exists_not_ortho_of_ne_zero hv simp [dotProduct_mulVec, hMv, zero_dotProduct, ne_eq, not_true] at hwMv · intro h v hv refine not_imp_not.mp (h v) (funext fun i => ?_) simpa only [dotProduct_mulVec, dotProduct_single, mul_one] using hv (Pi.single i 1)
import Mathlib.Analysis.SpecialFunctions.Complex.Circle import Mathlib.Geometry.Euclidean.Angle.Oriented.Basic #align_import geometry.euclidean.angle.oriented.rotation from "leanprover-community/mathlib"@"f0c8bf9245297a541f468be517f1bde6195105e9" noncomputable section open FiniteDimensional Complex open scoped Real RealInnerProductSpace ComplexConjugate namespace Orientation attribute [local instance] Complex.finrank_real_complex_fact variable {V V' : Type} variable [NormedAddCommGroup V] [NormedAddCommGroup V'] variable [InnerProductSpace ℝ V] [InnerProductSpace ℝ V'] variable [Fact (finrank ℝ V = 2)] [Fact (finrank ℝ V' = 2)] (o : Orientation ℝ V (Fin 2)) local notation "J" => o.rightAngleRotation def rotationAux (θ : Real.Angle) : V →ₗᵢ[ℝ] V := LinearMap.isometryOfInner (Real.Angle.cos θ • LinearMap.id + Real.Angle.sin θ • (LinearIsometryEquiv.toLinearEquiv J).toLinearMap) (by intro x y simp only [RCLike.conj_to_real, id, LinearMap.smul_apply, LinearMap.add_apply, LinearMap.id_coe, LinearEquiv.coe_coe, LinearIsometryEquiv.coe_toLinearEquiv, Orientation.areaForm_rightAngleRotation_left, Orientation.inner_rightAngleRotation_left, Orientation.inner_rightAngleRotation_right, inner_add_left, inner_smul_left, inner_add_right, inner_smul_right] linear_combination inner (𝕜 := ℝ) x y θ.cos_sq_add_sin_sq) #align orientation.rotation_aux Orientation.rotationAux @[simp] theorem rotationAux_apply (θ : Real.Angle) (x : V) : o.rotationAux θ x = Real.Angle.cos θ • x + Real.Angle.sin θ • J x := rfl #align orientation.rotation_aux_apply Orientation.rotationAux_apply def rotation (θ : Real.Angle) : V ≃ₗᵢ[ℝ] V := LinearIsometryEquiv.ofLinearIsometry (o.rotationAux θ) (Real.Angle.cos θ • LinearMap.id - Real.Angle.sin θ • (LinearIsometryEquiv.toLinearEquiv J).toLinearMap) (by ext x convert congr_arg (fun t : ℝ => t • x) θ.cos_sq_add_sin_sq using 1 · simp only [o.rightAngleRotation_rightAngleRotation, o.rotationAux_apply, Function.comp_apply, id, LinearEquiv.coe_coe, LinearIsometry.coe_toLinearMap, LinearIsometryEquiv.coe_toLinearEquiv, map_smul, map_sub, LinearMap.coe_comp, LinearMap.id_coe, LinearMap.smul_apply, LinearMap.sub_apply, ← mul_smul, add_smul, smul_add, smul_neg, smul_sub, mul_comm, sq] abel · simp) (by ext x convert congr_arg (fun t : ℝ => t • x) θ.cos_sq_add_sin_sq using 1 · simp only [o.rightAngleRotation_rightAngleRotation, o.rotationAux_apply, Function.comp_apply, id, LinearEquiv.coe_coe, LinearIsometry.coe_toLinearMap, LinearIsometryEquiv.coe_toLinearEquiv, map_add, map_smul, LinearMap.coe_comp, LinearMap.id_coe, LinearMap.smul_apply, LinearMap.sub_apply, add_smul, smul_neg, smul_sub, smul_smul] ring_nf abel · simp) #align orientation.rotation Orientation.rotation theorem rotation_apply (θ : Real.Angle) (x : V) : o.rotation θ x = Real.Angle.cos θ • x + Real.Angle.sin θ • J x := rfl #align orientation.rotation_apply Orientation.rotation_apply theorem rotation_symm_apply (θ : Real.Angle) (x : V) : (o.rotation θ).symm x = Real.Angle.cos θ • x - Real.Angle.sin θ • J x := rfl #align orientation.rotation_symm_apply Orientation.rotation_symm_apply theorem rotation_eq_matrix_toLin (θ : Real.Angle) {x : V} (hx : x ≠ 0) : (o.rotation θ).toLinearMap = Matrix.toLin (o.basisRightAngleRotation x hx) (o.basisRightAngleRotation x hx) !![θ.cos, -θ.sin; θ.sin, θ.cos] := by apply (o.basisRightAngleRotation x hx).ext intro i fin_cases i · rw [Matrix.toLin_self] simp [rotation_apply, Fin.sum_univ_succ] · rw [Matrix.toLin_self] simp [rotation_apply, Fin.sum_univ_succ, add_comm] #align orientation.rotation_eq_matrix_to_lin Orientation.rotation_eq_matrix_toLin @[simp] theorem det_rotation (θ : Real.Angle) : LinearMap.det (o.rotation θ).toLinearMap = 1 := by haveI : Nontrivial V := FiniteDimensional.nontrivial_of_finrank_eq_succ (@Fact.out (finrank ℝ V = 2) _) obtain ⟨x, hx⟩ : ∃ x, x ≠ (0 : V) := exists_ne (0 : V) rw [o.rotation_eq_matrix_toLin θ hx] simpa [sq] using θ.cos_sq_add_sin_sq #align orientation.det_rotation Orientation.det_rotation @[simp] theorem linearEquiv_det_rotation (θ : Real.Angle) : LinearEquiv.det (o.rotation θ).toLinearEquiv = 1 := Units.ext <\| by -- Porting note: Lean can't see through `LinearEquiv.coe_det` and needed the rewrite -- in mathlib3 this was just `units.ext <\| o.det_rotation θ` simpa only [LinearEquiv.coe_det, Units.val_one] using o.det_rotation θ #align orientation.linear_equiv_det_rotation Orientation.linearEquiv_det_rotation @[simp] theorem rotation_symm (θ : Real.Angle) : (o.rotation θ).symm = o.rotation (-θ) := by ext; simp [o.rotation_apply, o.rotation_symm_apply, sub_eq_add_neg] #align orientation.rotation_symm Orientation.rotation_symm @[simp] theorem rotation_zero : o.rotation 0 = LinearIsometryEquiv.refl ℝ V := by ext; simp [rotation] #align orientation.rotation_zero Orientation.rotation_zero @[simp] theorem rotation_pi : o.rotation π = LinearIsometryEquiv.neg ℝ := by ext x simp [rotation] #align orientation.rotation_pi Orientation.rotation_pi theorem rotation_pi_apply (x : V) : o.rotation π x = -x := by simp #align orientation.rotation_pi_apply Orientation.rotation_pi_apply theorem rotation_pi_div_two : o.rotation (π / 2 : ℝ) = J := by ext x simp [rotation] #align orientation.rotation_pi_div_two Orientation.rotation_pi_div_two @[simp] theorem rotation_rotation (θ₁ θ₂ : Real.Angle) (x : V) : o.rotation θ₁ (o.rotation θ₂ x) = o.rotation (θ₁ + θ₂) x := by simp only [o.rotation_apply, ← mul_smul, Real.Angle.cos_add, Real.Angle.sin_add, add_smul, sub_smul, LinearIsometryEquiv.trans_apply, smul_add, LinearIsometryEquiv.map_add, LinearIsometryEquiv.map_smul, rightAngleRotation_rightAngleRotation, smul_neg] ring_nf abel #align orientation.rotation_rotation Orientation.rotation_rotation @[simp] theorem rotation_trans (θ₁ θ₂ : Real.Angle) : (o.rotation θ₁).trans (o.rotation θ₂) = o.rotation (θ₂ + θ₁) := LinearIsometryEquiv.ext fun _ => by rw [← rotation_rotation, LinearIsometryEquiv.trans_apply] #align orientation.rotation_trans Orientation.rotation_trans @[simp] theorem kahler_rotation_left (x y : V) (θ : Real.Angle) : o.kahler (o.rotation θ x) y = conj (θ.expMapCircle : ℂ) * o.kahler x y := by -- Porting note: this needed the `Complex.conj_ofReal` instead of `RCLike.conj_ofReal`; -- I believe this is because the respective coercions are no longer defeq, and -- `Real.Angle.coe_expMapCircle` uses the `Complex` version. simp only [o.rotation_apply, map_add, map_mul, LinearMap.map_smulₛₗ, RingHom.id_apply, LinearMap.add_apply, LinearMap.smul_apply, real_smul, kahler_rightAngleRotation_left, Real.Angle.coe_expMapCircle, Complex.conj_ofReal, conj_I] ring #align orientation.kahler_rotation_left Orientation.kahler_rotation_left theorem neg_rotation (θ : Real.Angle) (x : V) : -o.rotation θ x = o.rotation (π + θ) x := by rw [← o.rotation_pi_apply, rotation_rotation] #align orientation.neg_rotation Orientation.neg_rotation @[simp] theorem neg_rotation_neg_pi_div_two (x : V) : -o.rotation (-π / 2 : ℝ) x = o.rotation (π / 2 : ℝ) x := by rw [neg_rotation, ← Real.Angle.coe_add, neg_div, ← sub_eq_add_neg, sub_half] #align orientation.neg_rotation_neg_pi_div_two Orientation.neg_rotation_neg_pi_div_two theorem neg_rotation_pi_div_two (x : V) : -o.rotation (π / 2 : ℝ) x = o.rotation (-π / 2 : ℝ) x := (neg_eq_iff_eq_neg.mp <\| o.neg_rotation_neg_pi_div_two _).symm #align orientation.neg_rotation_pi_div_two Orientation.neg_rotation_pi_div_two theorem kahler_rotation_left' (x y : V) (θ : Real.Angle) : o.kahler (o.rotation θ x) y = (-θ).expMapCircle * o.kahler x y := by simp only [Real.Angle.expMapCircle_neg, coe_inv_circle_eq_conj, kahler_rotation_left] #align orientation.kahler_rotation_left' Orientation.kahler_rotation_left' @[simp] theorem kahler_rotation_right (x y : V) (θ : Real.Angle) : o.kahler x (o.rotation θ y) = θ.expMapCircle * o.kahler x y := by simp only [o.rotation_apply, map_add, LinearMap.map_smulₛₗ, RingHom.id_apply, real_smul, kahler_rightAngleRotation_right, Real.Angle.coe_expMapCircle] ring #align orientation.kahler_rotation_right Orientation.kahler_rotation_right @[simp] theorem oangle_rotation_left {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) (θ : Real.Angle) : o.oangle (o.rotation θ x) y = o.oangle x y - θ := by simp only [oangle, o.kahler_rotation_left'] rw [Complex.arg_mul_coe_angle, Real.Angle.arg_expMapCircle] · abel · exact ne_zero_of_mem_circle _ · exact o.kahler_ne_zero hx hy #align orientation.oangle_rotation_left Orientation.oangle_rotation_left @[simp] theorem oangle_rotation_right {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) (θ : Real.Angle) : o.oangle x (o.rotation θ y) = o.oangle x y + θ := by simp only [oangle, o.kahler_rotation_right] rw [Complex.arg_mul_coe_angle, Real.Angle.arg_expMapCircle] · abel · exact ne_zero_of_mem_circle _ · exact o.kahler_ne_zero hx hy #align orientation.oangle_rotation_right Orientation.oangle_rotation_right @[simp] theorem oangle_rotation_self_left {x : V} (hx : x ≠ 0) (θ : Real.Angle) : o.oangle (o.rotation θ x) x = -θ := by simp [hx] #align orientation.oangle_rotation_self_left Orientation.oangle_rotation_self_left @[simp] theorem oangle_rotation_self_right {x : V} (hx : x ≠ 0) (θ : Real.Angle) : o.oangle x (o.rotation θ x) = θ := by simp [hx] #align orientation.oangle_rotation_self_right Orientation.oangle_rotation_self_right @[simp] theorem oangle_rotation_oangle_left (x y : V) : o.oangle (o.rotation (o.oangle x y) x) y = 0 := by by_cases hx : x = 0 · simp [hx] · by_cases hy : y = 0 · simp [hy] · simp [hx, hy] #align orientation.oangle_rotation_oangle_left Orientation.oangle_rotation_oangle_left @[simp] theorem oangle_rotation_oangle_right (x y : V) : o.oangle y (o.rotation (o.oangle x y) x) = 0 := by rw [oangle_rev] simp #align orientation.oangle_rotation_oangle_right Orientation.oangle_rotation_oangle_right @[simp] theorem oangle_rotation (x y : V) (θ : Real.Angle) : o.oangle (o.rotation θ x) (o.rotation θ y) = o.oangle x y := by by_cases hx : x = 0 <;> by_cases hy : y = 0 <;> simp [hx, hy] #align orientation.oangle_rotation Orientation.oangle_rotation @[simp] theorem rotation_eq_self_iff_angle_eq_zero {x : V} (hx : x ≠ 0) (θ : Real.Angle) : o.rotation θ x = x ↔ θ = 0 := by constructor · intro h rw [eq_comm] simpa [hx, h] using o.oangle_rotation_right hx hx θ · intro h simp [h] #align orientation.rotation_eq_self_iff_angle_eq_zero Orientation.rotation_eq_self_iff_angle_eq_zero @[simp] theorem eq_rotation_self_iff_angle_eq_zero {x : V} (hx : x ≠ 0) (θ : Real.Angle) : x = o.rotation θ x ↔ θ = 0 := by rw [← o.rotation_eq_self_iff_angle_eq_zero hx, eq_comm] #align orientation.eq_rotation_self_iff_angle_eq_zero Orientation.eq_rotation_self_iff_angle_eq_zero theorem rotation_eq_self_iff (x : V) (θ : Real.Angle) : o.rotation θ x = x ↔ x = 0 ∨ θ = 0 := by by_cases h : x = 0 <;> simp [h] #align orientation.rotation_eq_self_iff Orientation.rotation_eq_self_iff theorem eq_rotation_self_iff (x : V) (θ : Real.Angle) : x = o.rotation θ x ↔ x = 0 ∨ θ = 0 := by rw [← rotation_eq_self_iff, eq_comm] #align orientation.eq_rotation_self_iff Orientation.eq_rotation_self_iff @[simp] theorem rotation_oangle_eq_iff_norm_eq (x y : V) : o.rotation (o.oangle x y) x = y ↔ ‖x‖ = ‖y‖ := by constructor · intro h rw [← h, LinearIsometryEquiv.norm_map] · intro h rw [o.eq_iff_oangle_eq_zero_of_norm_eq] <;> simp [h] #align orientation.rotation_oangle_eq_iff_norm_eq Orientation.rotation_oangle_eq_iff_norm_eq theorem oangle_eq_iff_eq_norm_div_norm_smul_rotation_of_ne_zero {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) (θ : Real.Angle) : o.oangle x y = θ ↔ y = (‖y‖ / ‖x‖) • o.rotation θ x := by have hp := div_pos (norm_pos_iff.2 hy) (norm_pos_iff.2 hx) constructor · rintro rfl rw [← LinearIsometryEquiv.map_smul, ← o.oangle_smul_left_of_pos x y hp, eq_comm, rotation_oangle_eq_iff_norm_eq, norm_smul, Real.norm_of_nonneg hp.le, div_mul_cancel₀ _ (norm_ne_zero_iff.2 hx)] · intro hye rw [hye, o.oangle_smul_right_of_pos _ _ hp, o.oangle_rotation_self_right hx] #align orientation.oangle_eq_iff_eq_norm_div_norm_smul_rotation_of_ne_zero Orientation.oangle_eq_iff_eq_norm_div_norm_smul_rotation_of_ne_zero theorem oangle_eq_iff_eq_pos_smul_rotation_of_ne_zero {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) (θ : Real.Angle) : o.oangle x y = θ ↔ ∃ r : ℝ, 0 < r ∧ y = r • o.rotation θ x := by constructor · intro h rw [o.oangle_eq_iff_eq_norm_div_norm_smul_rotation_of_ne_zero hx hy] at h exact ⟨‖y‖ / ‖x‖, div_pos (norm_pos_iff.2 hy) (norm_pos_iff.2 hx), h⟩ · rintro ⟨r, hr, rfl⟩ rw [o.oangle_smul_right_of_pos _ _ hr, o.oangle_rotation_self_right hx] #align orientation.oangle_eq_iff_eq_pos_smul_rotation_of_ne_zero Orientation.oangle_eq_iff_eq_pos_smul_rotation_of_ne_zero theorem oangle_eq_iff_eq_norm_div_norm_smul_rotation_or_eq_zero {x y : V} (θ : Real.Angle) : o.oangle x y = θ ↔ x ≠ 0 ∧ y ≠ 0 ∧ y = (‖y‖ / ‖x‖) • o.rotation θ x ∨ θ = 0 ∧ (x = 0 ∨ y = 0) := by by_cases hx : x = 0 · simp [hx, eq_comm] · by_cases hy : y = 0 · simp [hy, eq_comm] · rw [o.oangle_eq_iff_eq_norm_div_norm_smul_rotation_of_ne_zero hx hy] simp [hx, hy] #align orientation.oangle_eq_iff_eq_norm_div_norm_smul_rotation_or_eq_zero Orientation.oangle_eq_iff_eq_norm_div_norm_smul_rotation_or_eq_zero theorem oangle_eq_iff_eq_pos_smul_rotation_or_eq_zero {x y : V} (θ : Real.Angle) : o.oangle x y = θ ↔ (x ≠ 0 ∧ y ≠ 0 ∧ ∃ r : ℝ, 0 < r ∧ y = r • o.rotation θ x) ∨ θ = 0 ∧ (x = 0 ∨ y = 0) := by by_cases hx : x = 0 · simp [hx, eq_comm] · by_cases hy : y = 0 · simp [hy, eq_comm] · rw [o.oangle_eq_iff_eq_pos_smul_rotation_of_ne_zero hx hy] simp [hx, hy] #align orientation.oangle_eq_iff_eq_pos_smul_rotation_or_eq_zero Orientation.oangle_eq_iff_eq_pos_smul_rotation_or_eq_zero theorem exists_linearIsometryEquiv_eq_of_det_pos {f : V ≃ₗᵢ[ℝ] V} (hd : 0 < LinearMap.det (f.toLinearEquiv : V →ₗ[ℝ] V)) : ∃ θ : Real.Angle, f = o.rotation θ := by haveI : Nontrivial V := FiniteDimensional.nontrivial_of_finrank_eq_succ (@Fact.out (finrank ℝ V = 2) _) obtain ⟨x, hx⟩ : ∃ x, x ≠ (0 : V) := exists_ne (0 : V) use o.oangle x (f x) apply LinearIsometryEquiv.toLinearEquiv_injective apply LinearEquiv.toLinearMap_injective apply (o.basisRightAngleRotation x hx).ext intro i symm fin_cases i · simp have : o.oangle (J x) (f (J x)) = o.oangle x (f x) := by simp only [oangle, o.linearIsometryEquiv_comp_rightAngleRotation f hd, o.kahler_comp_rightAngleRotation] simp [← this] #align orientation.exists_linear_isometry_equiv_eq_of_det_pos Orientation.exists_linearIsometryEquiv_eq_of_det_pos theorem rotation_map (θ : Real.Angle) (f : V ≃ₗᵢ[ℝ] V') (x : V') : (Orientation.map (Fin 2) f.toLinearEquiv o).rotation θ x = f (o.rotation θ (f.symm x)) := by simp [rotation_apply, o.rightAngleRotation_map] #align orientation.rotation_map Orientation.rotation_map @[simp] protected theorem _root_.Complex.rotation (θ : Real.Angle) (z : ℂ) : Complex.orientation.rotation θ z = θ.expMapCircle * z := by simp only [rotation_apply, Complex.rightAngleRotation, Real.Angle.coe_expMapCircle, real_smul] ring #align complex.rotation Complex.rotation theorem rotation_map_complex (θ : Real.Angle) (f : V ≃ₗᵢ[ℝ] ℂ) (hf : Orientation.map (Fin 2) f.toLinearEquiv o = Complex.orientation) (x : V) : f (o.rotation θ x) = θ.expMapCircle * f x := by rw [← Complex.rotation, ← hf, o.rotation_map, LinearIsometryEquiv.symm_apply_apply] #align orientation.rotation_map_complex Orientation.rotation_map_complex theorem rotation_neg_orientation_eq_neg (θ : Real.Angle) : (-o).rotation θ = o.rotation (-θ) := LinearIsometryEquiv.ext <\| by simp [rotation_apply] #align orientation.rotation_neg_orientation_eq_neg Orientation.rotation_neg_orientation_eq_neg @[simp] theorem inner_rotation_pi_div_two_left (x : V) : ⟪o.rotation (π / 2 : ℝ) x, x⟫ = 0 := by rw [rotation_pi_div_two, inner_rightAngleRotation_self] #align orientation.inner_rotation_pi_div_two_left Orientation.inner_rotation_pi_div_two_left @[simp] theorem inner_rotation_pi_div_two_right (x : V) : ⟪x, o.rotation (π / 2 : ℝ) x⟫ = 0 := by rw [real_inner_comm, inner_rotation_pi_div_two_left] #align orientation.inner_rotation_pi_div_two_right Orientation.inner_rotation_pi_div_two_right @[simp] theorem inner_smul_rotation_pi_div_two_left (x : V) (r : ℝ) : ⟪r • o.rotation (π / 2 : ℝ) x, x⟫ = 0 := by rw [inner_smul_left, inner_rotation_pi_div_two_left, mul_zero] #align orientation.inner_smul_rotation_pi_div_two_left Orientation.inner_smul_rotation_pi_div_two_left @[simp] theorem inner_smul_rotation_pi_div_two_right (x : V) (r : ℝ) : ⟪x, r • o.rotation (π / 2 : ℝ) x⟫ = 0 := by rw [real_inner_comm, inner_smul_rotation_pi_div_two_left] #align orientation.inner_smul_rotation_pi_div_two_right Orientation.inner_smul_rotation_pi_div_two_right @[simp] theorem inner_rotation_pi_div_two_left_smul (x : V) (r : ℝ) : ⟪o.rotation (π / 2 : ℝ) x, r • x⟫ = 0 := by rw [inner_smul_right, inner_rotation_pi_div_two_left, mul_zero] #align orientation.inner_rotation_pi_div_two_left_smul Orientation.inner_rotation_pi_div_two_left_smul @[simp] theorem inner_rotation_pi_div_two_right_smul (x : V) (r : ℝ) : ⟪r • x, o.rotation (π / 2 : ℝ) x⟫ = 0 := by rw [real_inner_comm, inner_rotation_pi_div_two_left_smul] #align orientation.inner_rotation_pi_div_two_right_smul Orientation.inner_rotation_pi_div_two_right_smul @[simp] theorem inner_smul_rotation_pi_div_two_smul_left (x : V) (r₁ r₂ : ℝ) : ⟪r₁ • o.rotation (π / 2 : ℝ) x, r₂ • x⟫ = 0 := by rw [inner_smul_right, inner_smul_rotation_pi_div_two_left, mul_zero] #align orientation.inner_smul_rotation_pi_div_two_smul_left Orientation.inner_smul_rotation_pi_div_two_smul_left @[simp]	Mathlib/Geometry/Euclidean/Angle/Oriented/Rotation.lean	477	479	theorem inner_smul_rotation_pi_div_two_smul_right (x : V) (r₁ r₂ : ℝ) : ⟪r₂ • x, r₁ • o.rotation (π / 2 : ℝ) x⟫ = 0 := by	rw [real_inner_comm, inner_smul_rotation_pi_div_two_smul_left]
import Mathlib.Data.Finset.Image import Mathlib.Data.List.FinRange #align_import data.fintype.basic from "leanprover-community/mathlib"@"d78597269638367c3863d40d45108f52207e03cf" assert_not_exists MonoidWithZero assert_not_exists MulAction open Function open Nat universe u v variable {α β γ : Type} class Fintype (α : Type) where elems : Finset α complete : ∀ x : α, x ∈ elems #align fintype Fintype namespace Finset variable [Fintype α] {s t : Finset α} def univ : Finset α := @Fintype.elems α _ #align finset.univ Finset.univ @[simp] theorem mem_univ (x : α) : x ∈ (univ : Finset α) := Fintype.complete x #align finset.mem_univ Finset.mem_univ -- Porting note: removing @[simp], simp can prove it theorem mem_univ_val : ∀ x, x ∈ (univ : Finset α).1 := mem_univ #align finset.mem_univ_val Finset.mem_univ_val theorem eq_univ_iff_forall : s = univ ↔ ∀ x, x ∈ s := by simp [ext_iff] #align finset.eq_univ_iff_forall Finset.eq_univ_iff_forall theorem eq_univ_of_forall : (∀ x, x ∈ s) → s = univ := eq_univ_iff_forall.2 #align finset.eq_univ_of_forall Finset.eq_univ_of_forall @[simp, norm_cast] theorem coe_univ : ↑(univ : Finset α) = (Set.univ : Set α) := by ext; simp #align finset.coe_univ Finset.coe_univ @[simp, norm_cast] theorem coe_eq_univ : (s : Set α) = Set.univ ↔ s = univ := by rw [← coe_univ, coe_inj] #align finset.coe_eq_univ Finset.coe_eq_univ theorem Nonempty.eq_univ [Subsingleton α] : s.Nonempty → s = univ := by rintro ⟨x, hx⟩ exact eq_univ_of_forall fun y => by rwa [Subsingleton.elim y x] #align finset.nonempty.eq_univ Finset.Nonempty.eq_univ theorem univ_nonempty_iff : (univ : Finset α).Nonempty ↔ Nonempty α := by rw [← coe_nonempty, coe_univ, Set.nonempty_iff_univ_nonempty] #align finset.univ_nonempty_iff Finset.univ_nonempty_iff @[aesop unsafe apply (rule_sets := [finsetNonempty])] theorem univ_nonempty [Nonempty α] : (univ : Finset α).Nonempty := univ_nonempty_iff.2 ‹_› #align finset.univ_nonempty Finset.univ_nonempty theorem univ_eq_empty_iff : (univ : Finset α) = ∅ ↔ IsEmpty α := by rw [← not_nonempty_iff, ← univ_nonempty_iff, not_nonempty_iff_eq_empty] #align finset.univ_eq_empty_iff Finset.univ_eq_empty_iff @[simp] theorem univ_eq_empty [IsEmpty α] : (univ : Finset α) = ∅ := univ_eq_empty_iff.2 ‹_› #align finset.univ_eq_empty Finset.univ_eq_empty @[simp] theorem univ_unique [Unique α] : (univ : Finset α) = {default} := Finset.ext fun x => iff_of_true (mem_univ _) <\| mem_singleton.2 <\| Subsingleton.elim x default #align finset.univ_unique Finset.univ_unique @[simp] theorem subset_univ (s : Finset α) : s ⊆ univ := fun a _ => mem_univ a #align finset.subset_univ Finset.subset_univ instance boundedOrder : BoundedOrder (Finset α) := { inferInstanceAs (OrderBot (Finset α)) with top := univ le_top := subset_univ } #align finset.bounded_order Finset.boundedOrder @[simp] theorem top_eq_univ : (⊤ : Finset α) = univ := rfl #align finset.top_eq_univ Finset.top_eq_univ theorem ssubset_univ_iff {s : Finset α} : s ⊂ univ ↔ s ≠ univ := @lt_top_iff_ne_top _ _ _ s #align finset.ssubset_univ_iff Finset.ssubset_univ_iff @[simp] theorem univ_subset_iff {s : Finset α} : univ ⊆ s ↔ s = univ := @top_le_iff _ _ _ s theorem codisjoint_left : Codisjoint s t ↔ ∀ ⦃a⦄, a ∉ s → a ∈ t := by classical simp [codisjoint_iff, eq_univ_iff_forall, or_iff_not_imp_left] #align finset.codisjoint_left Finset.codisjoint_left theorem codisjoint_right : Codisjoint s t ↔ ∀ ⦃a⦄, a ∉ t → a ∈ s := Codisjoint_comm.trans codisjoint_left #align finset.codisjoint_right Finset.codisjoint_right -- @[simp] --Note this would loop with `Finset.univ_unique` lemma singleton_eq_univ [Subsingleton α] (a : α) : ({a} : Finset α) = univ := by ext b; simp [Subsingleton.elim a b] theorem map_univ_of_surjective [Fintype β] {f : β ↪ α} (hf : Surjective f) : univ.map f = univ := eq_univ_of_forall <\| hf.forall.2 fun _ => mem_map_of_mem _ <\| mem_univ _ #align finset.map_univ_of_surjective Finset.map_univ_of_surjective @[simp] theorem map_univ_equiv [Fintype β] (f : β ≃ α) : univ.map f.toEmbedding = univ := map_univ_of_surjective f.surjective #align finset.map_univ_equiv Finset.map_univ_equiv theorem univ_map_equiv_to_embedding {α β : Type*} [Fintype α] [Fintype β] (e : α ≃ β) : univ.map e.toEmbedding = univ := eq_univ_iff_forall.mpr fun b => mem_map.mpr ⟨e.symm b, mem_univ _, by simp⟩ #align finset.univ_map_equiv_to_embedding Finset.univ_map_equiv_to_embedding @[simp]	Mathlib/Data/Fintype/Basic.lean	312	315	theorem univ_filter_exists (f : α → β) [Fintype β] [DecidablePred fun y => ∃ x, f x = y] [DecidableEq β] : (Finset.univ.filter fun y => ∃ x, f x = y) = Finset.univ.image f := by	ext simp
import Mathlib.Order.Filter.Basic #align_import order.filter.prod from "leanprover-community/mathlib"@"d6fad0e5bf2d6f48da9175d25c3dc5706b3834ce" open Set open Filter namespace Filter variable {α β γ δ : Type} {ι : Sort} section Prod variable {s : Set α} {t : Set β} {f : Filter α} {g : Filter β} protected def prod (f : Filter α) (g : Filter β) : Filter (α × β) := f.comap Prod.fst ⊓ g.comap Prod.snd #align filter.prod Filter.prod instance instSProd : SProd (Filter α) (Filter β) (Filter (α × β)) where sprod := Filter.prod theorem prod_mem_prod (hs : s ∈ f) (ht : t ∈ g) : s ×ˢ t ∈ f ×ˢ g := inter_mem_inf (preimage_mem_comap hs) (preimage_mem_comap ht) #align filter.prod_mem_prod Filter.prod_mem_prod theorem mem_prod_iff {s : Set (α × β)} {f : Filter α} {g : Filter β} : s ∈ f ×ˢ g ↔ ∃ t₁ ∈ f, ∃ t₂ ∈ g, t₁ ×ˢ t₂ ⊆ s := by simp only [SProd.sprod, Filter.prod] constructor · rintro ⟨t₁, ⟨s₁, hs₁, hts₁⟩, t₂, ⟨s₂, hs₂, hts₂⟩, rfl⟩ exact ⟨s₁, hs₁, s₂, hs₂, fun p ⟨h, h'⟩ => ⟨hts₁ h, hts₂ h'⟩⟩ · rintro ⟨t₁, ht₁, t₂, ht₂, h⟩ exact mem_inf_of_inter (preimage_mem_comap ht₁) (preimage_mem_comap ht₂) h #align filter.mem_prod_iff Filter.mem_prod_iff @[simp] theorem prod_mem_prod_iff [f.NeBot] [g.NeBot] : s ×ˢ t ∈ f ×ˢ g ↔ s ∈ f ∧ t ∈ g := ⟨fun h => let ⟨_s', hs', _t', ht', H⟩ := mem_prod_iff.1 h (prod_subset_prod_iff.1 H).elim (fun ⟨hs's, ht't⟩ => ⟨mem_of_superset hs' hs's, mem_of_superset ht' ht't⟩) fun h => h.elim (fun hs'e => absurd hs'e (nonempty_of_mem hs').ne_empty) fun ht'e => absurd ht'e (nonempty_of_mem ht').ne_empty, fun h => prod_mem_prod h.1 h.2⟩ #align filter.prod_mem_prod_iff Filter.prod_mem_prod_iff theorem mem_prod_principal {s : Set (α × β)} : s ∈ f ×ˢ 𝓟 t ↔ { a \| ∀ b ∈ t, (a, b) ∈ s } ∈ f := by rw [← @exists_mem_subset_iff _ f, mem_prod_iff] refine exists_congr fun u => Iff.rfl.and ⟨?_, fun h => ⟨t, mem_principal_self t, ?_⟩⟩ · rintro ⟨v, v_in, hv⟩ a a_in b b_in exact hv (mk_mem_prod a_in <\| v_in b_in) · rintro ⟨x, y⟩ ⟨hx, hy⟩ exact h hx y hy #align filter.mem_prod_principal Filter.mem_prod_principal theorem mem_prod_top {s : Set (α × β)} : s ∈ f ×ˢ (⊤ : Filter β) ↔ { a \| ∀ b, (a, b) ∈ s } ∈ f := by rw [← principal_univ, mem_prod_principal] simp only [mem_univ, forall_true_left] #align filter.mem_prod_top Filter.mem_prod_top theorem eventually_prod_principal_iff {p : α × β → Prop} {s : Set β} : (∀ᶠ x : α × β in f ×ˢ 𝓟 s, p x) ↔ ∀ᶠ x : α in f, ∀ y : β, y ∈ s → p (x, y) := by rw [eventually_iff, eventually_iff, mem_prod_principal] simp only [mem_setOf_eq] #align filter.eventually_prod_principal_iff Filter.eventually_prod_principal_iff theorem comap_prod (f : α → β × γ) (b : Filter β) (c : Filter γ) : comap f (b ×ˢ c) = comap (Prod.fst ∘ f) b ⊓ comap (Prod.snd ∘ f) c := by erw [comap_inf, Filter.comap_comap, Filter.comap_comap] #align filter.comap_prod Filter.comap_prod theorem prod_top : f ×ˢ (⊤ : Filter β) = f.comap Prod.fst := by dsimp only [SProd.sprod] rw [Filter.prod, comap_top, inf_top_eq] #align filter.prod_top Filter.prod_top theorem top_prod : (⊤ : Filter α) ×ˢ g = g.comap Prod.snd := by dsimp only [SProd.sprod] rw [Filter.prod, comap_top, top_inf_eq] theorem sup_prod (f₁ f₂ : Filter α) (g : Filter β) : (f₁ ⊔ f₂) ×ˢ g = (f₁ ×ˢ g) ⊔ (f₂ ×ˢ g) := by dsimp only [SProd.sprod] rw [Filter.prod, comap_sup, inf_sup_right, ← Filter.prod, ← Filter.prod] #align filter.sup_prod Filter.sup_prod theorem prod_sup (f : Filter α) (g₁ g₂ : Filter β) : f ×ˢ (g₁ ⊔ g₂) = (f ×ˢ g₁) ⊔ (f ×ˢ g₂) := by dsimp only [SProd.sprod] rw [Filter.prod, comap_sup, inf_sup_left, ← Filter.prod, ← Filter.prod] #align filter.prod_sup Filter.prod_sup theorem eventually_prod_iff {p : α × β → Prop} : (∀ᶠ x in f ×ˢ g, p x) ↔ ∃ pa : α → Prop, (∀ᶠ x in f, pa x) ∧ ∃ pb : β → Prop, (∀ᶠ y in g, pb y) ∧ ∀ {x}, pa x → ∀ {y}, pb y → p (x, y) := by simpa only [Set.prod_subset_iff] using @mem_prod_iff α β p f g #align filter.eventually_prod_iff Filter.eventually_prod_iff theorem tendsto_fst : Tendsto Prod.fst (f ×ˢ g) f := tendsto_inf_left tendsto_comap #align filter.tendsto_fst Filter.tendsto_fst theorem tendsto_snd : Tendsto Prod.snd (f ×ˢ g) g := tendsto_inf_right tendsto_comap #align filter.tendsto_snd Filter.tendsto_snd theorem Tendsto.fst {h : Filter γ} {m : α → β × γ} (H : Tendsto m f (g ×ˢ h)) : Tendsto (fun a ↦ (m a).1) f g := tendsto_fst.comp H theorem Tendsto.snd {h : Filter γ} {m : α → β × γ} (H : Tendsto m f (g ×ˢ h)) : Tendsto (fun a ↦ (m a).2) f h := tendsto_snd.comp H theorem Tendsto.prod_mk {h : Filter γ} {m₁ : α → β} {m₂ : α → γ} (h₁ : Tendsto m₁ f g) (h₂ : Tendsto m₂ f h) : Tendsto (fun x => (m₁ x, m₂ x)) f (g ×ˢ h) := tendsto_inf.2 ⟨tendsto_comap_iff.2 h₁, tendsto_comap_iff.2 h₂⟩ #align filter.tendsto.prod_mk Filter.Tendsto.prod_mk theorem tendsto_prod_swap : Tendsto (Prod.swap : α × β → β × α) (f ×ˢ g) (g ×ˢ f) := tendsto_snd.prod_mk tendsto_fst #align filter.tendsto_prod_swap Filter.tendsto_prod_swap theorem Eventually.prod_inl {la : Filter α} {p : α → Prop} (h : ∀ᶠ x in la, p x) (lb : Filter β) : ∀ᶠ x in la ×ˢ lb, p (x : α × β).1 := tendsto_fst.eventually h #align filter.eventually.prod_inl Filter.Eventually.prod_inl theorem Eventually.prod_inr {lb : Filter β} {p : β → Prop} (h : ∀ᶠ x in lb, p x) (la : Filter α) : ∀ᶠ x in la ×ˢ lb, p (x : α × β).2 := tendsto_snd.eventually h #align filter.eventually.prod_inr Filter.Eventually.prod_inr theorem Eventually.prod_mk {la : Filter α} {pa : α → Prop} (ha : ∀ᶠ x in la, pa x) {lb : Filter β} {pb : β → Prop} (hb : ∀ᶠ y in lb, pb y) : ∀ᶠ p in la ×ˢ lb, pa (p : α × β).1 ∧ pb p.2 := (ha.prod_inl lb).and (hb.prod_inr la) #align filter.eventually.prod_mk Filter.Eventually.prod_mk theorem EventuallyEq.prod_map {δ} {la : Filter α} {fa ga : α → γ} (ha : fa =ᶠ[la] ga) {lb : Filter β} {fb gb : β → δ} (hb : fb =ᶠ[lb] gb) : Prod.map fa fb =ᶠ[la ×ˢ lb] Prod.map ga gb := (Eventually.prod_mk ha hb).mono fun _ h => Prod.ext h.1 h.2 #align filter.eventually_eq.prod_map Filter.EventuallyEq.prod_map theorem EventuallyLE.prod_map {δ} [LE γ] [LE δ] {la : Filter α} {fa ga : α → γ} (ha : fa ≤ᶠ[la] ga) {lb : Filter β} {fb gb : β → δ} (hb : fb ≤ᶠ[lb] gb) : Prod.map fa fb ≤ᶠ[la ×ˢ lb] Prod.map ga gb := Eventually.prod_mk ha hb #align filter.eventually_le.prod_map Filter.EventuallyLE.prod_map theorem Eventually.curry {la : Filter α} {lb : Filter β} {p : α × β → Prop} (h : ∀ᶠ x in la ×ˢ lb, p x) : ∀ᶠ x in la, ∀ᶠ y in lb, p (x, y) := by rcases eventually_prod_iff.1 h with ⟨pa, ha, pb, hb, h⟩ exact ha.mono fun a ha => hb.mono fun b hb => h ha hb #align filter.eventually.curry Filter.Eventually.curry protected lemma Frequently.uncurry {la : Filter α} {lb : Filter β} {p : α → β → Prop} (h : ∃ᶠ x in la, ∃ᶠ y in lb, p x y) : ∃ᶠ xy in la ×ˢ lb, p xy.1 xy.2 := mt (fun h ↦ by simpa only [not_frequently] using h.curry) h theorem Eventually.diag_of_prod {p : α × α → Prop} (h : ∀ᶠ i in f ×ˢ f, p i) : ∀ᶠ i in f, p (i, i) := by obtain ⟨t, ht, s, hs, hst⟩ := eventually_prod_iff.1 h apply (ht.and hs).mono fun x hx => hst hx.1 hx.2 #align filter.eventually.diag_of_prod Filter.Eventually.diag_of_prod theorem Eventually.diag_of_prod_left {f : Filter α} {g : Filter γ} {p : (α × α) × γ → Prop} : (∀ᶠ x in (f ×ˢ f) ×ˢ g, p x) → ∀ᶠ x : α × γ in f ×ˢ g, p ((x.1, x.1), x.2) := by intro h obtain ⟨t, ht, s, hs, hst⟩ := eventually_prod_iff.1 h exact (ht.diag_of_prod.prod_mk hs).mono fun x hx => by simp only [hst hx.1 hx.2] #align filter.eventually.diag_of_prod_left Filter.Eventually.diag_of_prod_left theorem Eventually.diag_of_prod_right {f : Filter α} {g : Filter γ} {p : α × γ × γ → Prop} : (∀ᶠ x in f ×ˢ (g ×ˢ g), p x) → ∀ᶠ x : α × γ in f ×ˢ g, p (x.1, x.2, x.2) := by intro h obtain ⟨t, ht, s, hs, hst⟩ := eventually_prod_iff.1 h exact (ht.prod_mk hs.diag_of_prod).mono fun x hx => by simp only [hst hx.1 hx.2] #align filter.eventually.diag_of_prod_right Filter.Eventually.diag_of_prod_right theorem tendsto_diag : Tendsto (fun i => (i, i)) f (f ×ˢ f) := tendsto_iff_eventually.mpr fun _ hpr => hpr.diag_of_prod #align filter.tendsto_diag Filter.tendsto_diag theorem prod_iInf_left [Nonempty ι] {f : ι → Filter α} {g : Filter β} : (⨅ i, f i) ×ˢ g = ⨅ i, f i ×ˢ g := by dsimp only [SProd.sprod] rw [Filter.prod, comap_iInf, iInf_inf] simp only [Filter.prod, eq_self_iff_true] #align filter.prod_infi_left Filter.prod_iInf_left theorem prod_iInf_right [Nonempty ι] {f : Filter α} {g : ι → Filter β} : (f ×ˢ ⨅ i, g i) = ⨅ i, f ×ˢ g i := by dsimp only [SProd.sprod] rw [Filter.prod, comap_iInf, inf_iInf] simp only [Filter.prod, eq_self_iff_true] #align filter.prod_infi_right Filter.prod_iInf_right @[mono, gcongr] theorem prod_mono {f₁ f₂ : Filter α} {g₁ g₂ : Filter β} (hf : f₁ ≤ f₂) (hg : g₁ ≤ g₂) : f₁ ×ˢ g₁ ≤ f₂ ×ˢ g₂ := inf_le_inf (comap_mono hf) (comap_mono hg) #align filter.prod_mono Filter.prod_mono @[gcongr] theorem prod_mono_left (g : Filter β) {f₁ f₂ : Filter α} (hf : f₁ ≤ f₂) : f₁ ×ˢ g ≤ f₂ ×ˢ g := Filter.prod_mono hf rfl.le #align filter.prod_mono_left Filter.prod_mono_left @[gcongr] theorem prod_mono_right (f : Filter α) {g₁ g₂ : Filter β} (hf : g₁ ≤ g₂) : f ×ˢ g₁ ≤ f ×ˢ g₂ := Filter.prod_mono rfl.le hf #align filter.prod_mono_right Filter.prod_mono_right theorem prod_comap_comap_eq.{u, v, w, x} {α₁ : Type u} {α₂ : Type v} {β₁ : Type w} {β₂ : Type x} {f₁ : Filter α₁} {f₂ : Filter α₂} {m₁ : β₁ → α₁} {m₂ : β₂ → α₂} : comap m₁ f₁ ×ˢ comap m₂ f₂ = comap (fun p : β₁ × β₂ => (m₁ p.1, m₂ p.2)) (f₁ ×ˢ f₂) := by simp only [SProd.sprod, Filter.prod, comap_comap, comap_inf, (· ∘ ·)] #align filter.prod_comap_comap_eq Filter.prod_comap_comap_eq theorem prod_comm' : f ×ˢ g = comap Prod.swap (g ×ˢ f) := by simp only [SProd.sprod, Filter.prod, comap_comap, (· ∘ ·), inf_comm, Prod.swap, comap_inf] #align filter.prod_comm' Filter.prod_comm' theorem prod_comm : f ×ˢ g = map (fun p : β × α => (p.2, p.1)) (g ×ˢ f) := by rw [prod_comm', ← map_swap_eq_comap_swap] rfl #align filter.prod_comm Filter.prod_comm theorem mem_prod_iff_left {s : Set (α × β)} : s ∈ f ×ˢ g ↔ ∃ t ∈ f, ∀ᶠ y in g, ∀ x ∈ t, (x, y) ∈ s := by simp only [mem_prod_iff, prod_subset_iff] refine exists_congr fun _ => Iff.rfl.and <\| Iff.trans ?_ exists_mem_subset_iff exact exists_congr fun _ => Iff.rfl.and forall₂_swap theorem mem_prod_iff_right {s : Set (α × β)} : s ∈ f ×ˢ g ↔ ∃ t ∈ g, ∀ᶠ x in f, ∀ y ∈ t, (x, y) ∈ s := by rw [prod_comm, mem_map, mem_prod_iff_left]; rfl @[simp] theorem map_fst_prod (f : Filter α) (g : Filter β) [NeBot g] : map Prod.fst (f ×ˢ g) = f := by ext s simp only [mem_map, mem_prod_iff_left, mem_preimage, eventually_const, ← subset_def, exists_mem_subset_iff] #align filter.map_fst_prod Filter.map_fst_prod @[simp] theorem map_snd_prod (f : Filter α) (g : Filter β) [NeBot f] : map Prod.snd (f ×ˢ g) = g := by rw [prod_comm, map_map]; apply map_fst_prod #align filter.map_snd_prod Filter.map_snd_prod @[simp] theorem prod_le_prod {f₁ f₂ : Filter α} {g₁ g₂ : Filter β} [NeBot f₁] [NeBot g₁] : f₁ ×ˢ g₁ ≤ f₂ ×ˢ g₂ ↔ f₁ ≤ f₂ ∧ g₁ ≤ g₂ := ⟨fun h => ⟨map_fst_prod f₁ g₁ ▸ tendsto_fst.mono_left h, map_snd_prod f₁ g₁ ▸ tendsto_snd.mono_left h⟩, fun h => prod_mono h.1 h.2⟩ #align filter.prod_le_prod Filter.prod_le_prod @[simp] theorem prod_inj {f₁ f₂ : Filter α} {g₁ g₂ : Filter β} [NeBot f₁] [NeBot g₁] : f₁ ×ˢ g₁ = f₂ ×ˢ g₂ ↔ f₁ = f₂ ∧ g₁ = g₂ := by refine ⟨fun h => ?_, fun h => h.1 ▸ h.2 ▸ rfl⟩ have hle : f₁ ≤ f₂ ∧ g₁ ≤ g₂ := prod_le_prod.1 h.le haveI := neBot_of_le hle.1; haveI := neBot_of_le hle.2 exact ⟨hle.1.antisymm <\| (prod_le_prod.1 h.ge).1, hle.2.antisymm <\| (prod_le_prod.1 h.ge).2⟩ #align filter.prod_inj Filter.prod_inj	Mathlib/Order/Filter/Prod.lean	316	318	theorem eventually_swap_iff {p : α × β → Prop} : (∀ᶠ x : α × β in f ×ˢ g, p x) ↔ ∀ᶠ y : β × α in g ×ˢ f, p y.swap := by	rw [prod_comm]; rfl
import Mathlib.Algebra.BigOperators.Group.Finset import Mathlib.Algebra.Group.Commute.Hom import Mathlib.Data.Fintype.Card #align_import data.finset.noncomm_prod from "leanprover-community/mathlib"@"509de852e1de55e1efa8eacfa11df0823f26f226" variable {F ι α β γ : Type*} (f : α → β → β) (op : α → α → α) namespace Multiset def noncommFoldr (s : Multiset α) (comm : { x \| x ∈ s }.Pairwise fun x y => ∀ b, f x (f y b) = f y (f x b)) (b : β) : β := s.attach.foldr (f ∘ Subtype.val) (fun ⟨_, hx⟩ ⟨_, hy⟩ => haveI : IsRefl α fun x y => ∀ b, f x (f y b) = f y (f x b) := ⟨fun _ _ => rfl⟩ comm.of_refl hx hy) b #align multiset.noncomm_foldr Multiset.noncommFoldr @[simp] theorem noncommFoldr_coe (l : List α) (comm) (b : β) : noncommFoldr f (l : Multiset α) comm b = l.foldr f b := by simp only [noncommFoldr, coe_foldr, coe_attach, List.attach, List.attachWith, Function.comp] rw [← List.foldr_map] simp [List.map_pmap] #align multiset.noncomm_foldr_coe Multiset.noncommFoldr_coe @[simp] theorem noncommFoldr_empty (h) (b : β) : noncommFoldr f (0 : Multiset α) h b = b := rfl #align multiset.noncomm_foldr_empty Multiset.noncommFoldr_empty theorem noncommFoldr_cons (s : Multiset α) (a : α) (h h') (b : β) : noncommFoldr f (a ::ₘ s) h b = f a (noncommFoldr f s h' b) := by induction s using Quotient.inductionOn simp #align multiset.noncomm_foldr_cons Multiset.noncommFoldr_cons theorem noncommFoldr_eq_foldr (s : Multiset α) (h : LeftCommutative f) (b : β) : noncommFoldr f s (fun x _ y _ _ => h x y) b = foldr f h b s := by induction s using Quotient.inductionOn simp #align multiset.noncomm_foldr_eq_foldr Multiset.noncommFoldr_eq_foldr section assoc variable [assoc : Std.Associative op] def noncommFold (s : Multiset α) (comm : { x \| x ∈ s }.Pairwise fun x y => op x y = op y x) : α → α := noncommFoldr op s fun x hx y hy h b => by rw [← assoc.assoc, comm hx hy h, assoc.assoc] #align multiset.noncomm_fold Multiset.noncommFold @[simp] theorem noncommFold_coe (l : List α) (comm) (a : α) : noncommFold op (l : Multiset α) comm a = l.foldr op a := by simp [noncommFold] #align multiset.noncomm_fold_coe Multiset.noncommFold_coe @[simp] theorem noncommFold_empty (h) (a : α) : noncommFold op (0 : Multiset α) h a = a := rfl #align multiset.noncomm_fold_empty Multiset.noncommFold_empty	Mathlib/Data/Finset/NoncommProd.lean	97	100	theorem noncommFold_cons (s : Multiset α) (a : α) (h h') (x : α) : noncommFold op (a ::ₘ s) h x = op a (noncommFold op s h' x) := by	induction s using Quotient.inductionOn simp
import Mathlib.Algebra.GCDMonoid.Basic import Mathlib.Algebra.Order.Ring.Int import Mathlib.Data.Int.GCD instance : GCDMonoid ℕ where gcd := Nat.gcd lcm := Nat.lcm gcd_dvd_left := Nat.gcd_dvd_left gcd_dvd_right := Nat.gcd_dvd_right dvd_gcd := Nat.dvd_gcd gcd_mul_lcm a b := by rw [Nat.gcd_mul_lcm]; rfl lcm_zero_left := Nat.lcm_zero_left lcm_zero_right := Nat.lcm_zero_right theorem gcd_eq_nat_gcd (m n : ℕ) : gcd m n = Nat.gcd m n := rfl #align gcd_eq_nat_gcd gcd_eq_nat_gcd theorem lcm_eq_nat_lcm (m n : ℕ) : lcm m n = Nat.lcm m n := rfl #align lcm_eq_nat_lcm lcm_eq_nat_lcm instance : NormalizedGCDMonoid ℕ := { (inferInstance : GCDMonoid ℕ), (inferInstance : NormalizationMonoid ℕ) with normalize_gcd := fun _ _ => normalize_eq _ normalize_lcm := fun _ _ => normalize_eq _ } namespace Int section NormalizationMonoid instance normalizationMonoid : NormalizationMonoid ℤ where normUnit a := if 0 ≤ a then 1 else -1 normUnit_zero := if_pos le_rfl normUnit_mul {a b} hna hnb := by cases' hna.lt_or_lt with ha ha <;> cases' hnb.lt_or_lt with hb hb <;> simp [mul_nonneg_iff, ha.le, ha.not_le, hb.le, hb.not_le] normUnit_coe_units u := (units_eq_one_or u).elim (fun eq => eq.symm ▸ if_pos zero_le_one) fun eq => eq.symm ▸ if_neg (not_le_of_gt <\| show (-1 : ℤ) < 0 by decide) -- Porting note: added theorem normUnit_eq (z : ℤ) : normUnit z = if 0 ≤ z then 1 else -1 := rfl theorem normalize_of_nonneg {z : ℤ} (h : 0 ≤ z) : normalize z = z := by rw [normalize_apply, normUnit_eq, if_pos h, Units.val_one, mul_one] #align int.normalize_of_nonneg Int.normalize_of_nonneg theorem normalize_of_nonpos {z : ℤ} (h : z ≤ 0) : normalize z = -z := by obtain rfl \| h := h.eq_or_lt · simp · rw [normalize_apply, normUnit_eq, if_neg (not_le_of_gt h), Units.val_neg, Units.val_one, mul_neg_one] #align int.normalize_of_nonpos Int.normalize_of_nonpos theorem normalize_coe_nat (n : ℕ) : normalize (n : ℤ) = n := normalize_of_nonneg (ofNat_le_ofNat_of_le <\| Nat.zero_le n) #align int.normalize_coe_nat Int.normalize_coe_nat	Mathlib/Algebra/GCDMonoid/Nat.lean	82	83	theorem abs_eq_normalize (z : ℤ) : \|z\| = normalize z := by	cases le_total 0 z <;> simp [-normalize_apply, normalize_of_nonneg, normalize_of_nonpos, *]
import Mathlib.Geometry.Manifold.SmoothManifoldWithCorners import Mathlib.Geometry.Manifold.LocalInvariantProperties #align_import geometry.manifold.cont_mdiff from "leanprover-community/mathlib"@"e5ab837fc252451f3eb9124ae6e7b6f57455e7b9" open Set Function Filter ChartedSpace SmoothManifoldWithCorners open scoped Topology Manifold variable {𝕜 : Type} [NontriviallyNormedField 𝕜] -- declare a smooth manifold `M` over the pair `(E, H)`. {E : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] {H : Type} [TopologicalSpace H] (I : ModelWithCorners 𝕜 E H) {M : Type} [TopologicalSpace M] [ChartedSpace H M] [SmoothManifoldWithCorners I M] -- declare a smooth manifold `M'` over the pair `(E', H')`. {E' : Type} [NormedAddCommGroup E'] [NormedSpace 𝕜 E'] {H' : Type} [TopologicalSpace H'] (I' : ModelWithCorners 𝕜 E' H') {M' : Type} [TopologicalSpace M'] [ChartedSpace H' M'] [SmoothManifoldWithCorners I' M'] -- declare a manifold `M''` over the pair `(E'', H'')`. {E'' : Type} [NormedAddCommGroup E''] [NormedSpace 𝕜 E''] {H'' : Type} [TopologicalSpace H''] {I'' : ModelWithCorners 𝕜 E'' H''} {M'' : Type} [TopologicalSpace M''] [ChartedSpace H'' M''] -- declare a smooth manifold `N` over the pair `(F, G)`. {F : Type} [NormedAddCommGroup F] [NormedSpace 𝕜 F] {G : Type} [TopologicalSpace G] {J : ModelWithCorners 𝕜 F G} {N : Type} [TopologicalSpace N] [ChartedSpace G N] [SmoothManifoldWithCorners J N] -- declare a smooth manifold `N'` over the pair `(F', G')`. {F' : Type} [NormedAddCommGroup F'] [NormedSpace 𝕜 F'] {G' : Type} [TopologicalSpace G'] {J' : ModelWithCorners 𝕜 F' G'} {N' : Type} [TopologicalSpace N'] [ChartedSpace G' N'] [SmoothManifoldWithCorners J' N'] -- F₁, F₂, F₃, F₄ are normed spaces {F₁ : Type} [NormedAddCommGroup F₁] [NormedSpace 𝕜 F₁] {F₂ : Type} [NormedAddCommGroup F₂] [NormedSpace 𝕜 F₂] {F₃ : Type} [NormedAddCommGroup F₃] [NormedSpace 𝕜 F₃] {F₄ : Type} [NormedAddCommGroup F₄] [NormedSpace 𝕜 F₄] -- declare functions, sets, points and smoothness indices {e : PartialHomeomorph M H} {e' : PartialHomeomorph M' H'} {f f₁ : M → M'} {s s₁ t : Set M} {x : M} {m n : ℕ∞} def ContDiffWithinAtProp (n : ℕ∞) (f : H → H') (s : Set H) (x : H) : Prop := ContDiffWithinAt 𝕜 n (I' ∘ f ∘ I.symm) (I.symm ⁻¹' s ∩ range I) (I x) #align cont_diff_within_at_prop ContDiffWithinAtProp theorem contDiffWithinAtProp_self_source {f : E → H'} {s : Set E} {x : E} : ContDiffWithinAtProp 𝓘(𝕜, E) I' n f s x ↔ ContDiffWithinAt 𝕜 n (I' ∘ f) s x := by simp_rw [ContDiffWithinAtProp, modelWithCornersSelf_coe, range_id, inter_univ, modelWithCornersSelf_coe_symm, CompTriple.comp_eq, preimage_id_eq, id_eq] #align cont_diff_within_at_prop_self_source contDiffWithinAtProp_self_source theorem contDiffWithinAtProp_self {f : E → E'} {s : Set E} {x : E} : ContDiffWithinAtProp 𝓘(𝕜, E) 𝓘(𝕜, E') n f s x ↔ ContDiffWithinAt 𝕜 n f s x := contDiffWithinAtProp_self_source 𝓘(𝕜, E') #align cont_diff_within_at_prop_self contDiffWithinAtProp_self theorem contDiffWithinAtProp_self_target {f : H → E'} {s : Set H} {x : H} : ContDiffWithinAtProp I 𝓘(𝕜, E') n f s x ↔ ContDiffWithinAt 𝕜 n (f ∘ I.symm) (I.symm ⁻¹' s ∩ range I) (I x) := Iff.rfl #align cont_diff_within_at_prop_self_target contDiffWithinAtProp_self_target theorem contDiffWithinAt_localInvariantProp (n : ℕ∞) : (contDiffGroupoid ∞ I).LocalInvariantProp (contDiffGroupoid ∞ I') (ContDiffWithinAtProp I I' n) where is_local {s x u f} u_open xu := by have : I.symm ⁻¹' (s ∩ u) ∩ range I = I.symm ⁻¹' s ∩ range I ∩ I.symm ⁻¹' u := by simp only [inter_right_comm, preimage_inter] rw [ContDiffWithinAtProp, ContDiffWithinAtProp, this] symm apply contDiffWithinAt_inter have : u ∈ 𝓝 (I.symm (I x)) := by rw [ModelWithCorners.left_inv] exact u_open.mem_nhds xu apply ContinuousAt.preimage_mem_nhds I.continuous_symm.continuousAt this right_invariance' {s x f e} he hx h := by rw [ContDiffWithinAtProp] at h ⊢ have : I x = (I ∘ e.symm ∘ I.symm) (I (e x)) := by simp only [hx, mfld_simps] rw [this] at h have : I (e x) ∈ I.symm ⁻¹' e.target ∩ range I := by simp only [hx, mfld_simps] have := (mem_groupoid_of_pregroupoid.2 he).2.contDiffWithinAt this convert (h.comp' _ (this.of_le le_top)).mono_of_mem _ using 1 · ext y; simp only [mfld_simps] refine mem_nhdsWithin.mpr ⟨I.symm ⁻¹' e.target, e.open_target.preimage I.continuous_symm, by simp_rw [mem_preimage, I.left_inv, e.mapsTo hx], ?_⟩ mfld_set_tac congr_of_forall {s x f g} h hx hf := by apply hf.congr · intro y hy simp only [mfld_simps] at hy simp only [h, hy, mfld_simps] · simp only [hx, mfld_simps] left_invariance' {s x f e'} he' hs hx h := by rw [ContDiffWithinAtProp] at h ⊢ have A : (I' ∘ f ∘ I.symm) (I x) ∈ I'.symm ⁻¹' e'.source ∩ range I' := by simp only [hx, mfld_simps] have := (mem_groupoid_of_pregroupoid.2 he').1.contDiffWithinAt A convert (this.of_le le_top).comp _ h _ · ext y; simp only [mfld_simps] · intro y hy; simp only [mfld_simps] at hy; simpa only [hy, mfld_simps] using hs hy.1 #align cont_diff_within_at_local_invariant_prop contDiffWithinAt_localInvariantProp theorem contDiffWithinAtProp_mono_of_mem (n : ℕ∞) ⦃s x t⦄ ⦃f : H → H'⦄ (hts : s ∈ 𝓝[t] x) (h : ContDiffWithinAtProp I I' n f s x) : ContDiffWithinAtProp I I' n f t x := by refine h.mono_of_mem ?_ refine inter_mem ?_ (mem_of_superset self_mem_nhdsWithin inter_subset_right) rwa [← Filter.mem_map, ← I.image_eq, I.symm_map_nhdsWithin_image] #align cont_diff_within_at_prop_mono_of_mem contDiffWithinAtProp_mono_of_mem theorem contDiffWithinAtProp_id (x : H) : ContDiffWithinAtProp I I n id univ x := by simp only [ContDiffWithinAtProp, id_comp, preimage_univ, univ_inter] have : ContDiffWithinAt 𝕜 n id (range I) (I x) := contDiff_id.contDiffAt.contDiffWithinAt refine this.congr (fun y hy => ?_) ?_ · simp only [ModelWithCorners.right_inv I hy, mfld_simps] · simp only [mfld_simps] #align cont_diff_within_at_prop_id contDiffWithinAtProp_id def ContMDiffWithinAt (n : ℕ∞) (f : M → M') (s : Set M) (x : M) := LiftPropWithinAt (ContDiffWithinAtProp I I' n) f s x #align cont_mdiff_within_at ContMDiffWithinAt abbrev SmoothWithinAt (f : M → M') (s : Set M) (x : M) := ContMDiffWithinAt I I' ⊤ f s x #align smooth_within_at SmoothWithinAt def ContMDiffAt (n : ℕ∞) (f : M → M') (x : M) := ContMDiffWithinAt I I' n f univ x #align cont_mdiff_at ContMDiffAt theorem contMDiffAt_iff {n : ℕ∞} {f : M → M'} {x : M} : ContMDiffAt I I' n f x ↔ ContinuousAt f x ∧ ContDiffWithinAt 𝕜 n (extChartAt I' (f x) ∘ f ∘ (extChartAt I x).symm) (range I) (extChartAt I x x) := liftPropAt_iff.trans <\| by rw [ContDiffWithinAtProp, preimage_univ, univ_inter]; rfl #align cont_mdiff_at_iff contMDiffAt_iff abbrev SmoothAt (f : M → M') (x : M) := ContMDiffAt I I' ⊤ f x #align smooth_at SmoothAt def ContMDiffOn (n : ℕ∞) (f : M → M') (s : Set M) := ∀ x ∈ s, ContMDiffWithinAt I I' n f s x #align cont_mdiff_on ContMDiffOn abbrev SmoothOn (f : M → M') (s : Set M) := ContMDiffOn I I' ⊤ f s #align smooth_on SmoothOn def ContMDiff (n : ℕ∞) (f : M → M') := ∀ x, ContMDiffAt I I' n f x #align cont_mdiff ContMDiff abbrev Smooth (f : M → M') := ContMDiff I I' ⊤ f #align smooth Smooth variable {I I'} theorem ContMDiffWithinAt.of_le (hf : ContMDiffWithinAt I I' n f s x) (le : m ≤ n) : ContMDiffWithinAt I I' m f s x := by simp only [ContMDiffWithinAt, LiftPropWithinAt] at hf ⊢ exact ⟨hf.1, hf.2.of_le le⟩ #align cont_mdiff_within_at.of_le ContMDiffWithinAt.of_le theorem ContMDiffAt.of_le (hf : ContMDiffAt I I' n f x) (le : m ≤ n) : ContMDiffAt I I' m f x := ContMDiffWithinAt.of_le hf le #align cont_mdiff_at.of_le ContMDiffAt.of_le theorem ContMDiffOn.of_le (hf : ContMDiffOn I I' n f s) (le : m ≤ n) : ContMDiffOn I I' m f s := fun x hx => (hf x hx).of_le le #align cont_mdiff_on.of_le ContMDiffOn.of_le theorem ContMDiff.of_le (hf : ContMDiff I I' n f) (le : m ≤ n) : ContMDiff I I' m f := fun x => (hf x).of_le le #align cont_mdiff.of_le ContMDiff.of_le theorem ContMDiff.smooth (h : ContMDiff I I' ⊤ f) : Smooth I I' f := h #align cont_mdiff.smooth ContMDiff.smooth theorem Smooth.contMDiff (h : Smooth I I' f) : ContMDiff I I' n f := h.of_le le_top #align smooth.cont_mdiff Smooth.contMDiff theorem ContMDiffOn.smoothOn (h : ContMDiffOn I I' ⊤ f s) : SmoothOn I I' f s := h #align cont_mdiff_on.smooth_on ContMDiffOn.smoothOn theorem SmoothOn.contMDiffOn (h : SmoothOn I I' f s) : ContMDiffOn I I' n f s := h.of_le le_top #align smooth_on.cont_mdiff_on SmoothOn.contMDiffOn theorem ContMDiffAt.smoothAt (h : ContMDiffAt I I' ⊤ f x) : SmoothAt I I' f x := h #align cont_mdiff_at.smooth_at ContMDiffAt.smoothAt theorem SmoothAt.contMDiffAt (h : SmoothAt I I' f x) : ContMDiffAt I I' n f x := h.of_le le_top #align smooth_at.cont_mdiff_at SmoothAt.contMDiffAt theorem ContMDiffWithinAt.smoothWithinAt (h : ContMDiffWithinAt I I' ⊤ f s x) : SmoothWithinAt I I' f s x := h #align cont_mdiff_within_at.smooth_within_at ContMDiffWithinAt.smoothWithinAt theorem SmoothWithinAt.contMDiffWithinAt (h : SmoothWithinAt I I' f s x) : ContMDiffWithinAt I I' n f s x := h.of_le le_top #align smooth_within_at.cont_mdiff_within_at SmoothWithinAt.contMDiffWithinAt theorem ContMDiff.contMDiffAt (h : ContMDiff I I' n f) : ContMDiffAt I I' n f x := h x #align cont_mdiff.cont_mdiff_at ContMDiff.contMDiffAt theorem Smooth.smoothAt (h : Smooth I I' f) : SmoothAt I I' f x := ContMDiff.contMDiffAt h #align smooth.smooth_at Smooth.smoothAt theorem contMDiffWithinAt_univ : ContMDiffWithinAt I I' n f univ x ↔ ContMDiffAt I I' n f x := Iff.rfl #align cont_mdiff_within_at_univ contMDiffWithinAt_univ theorem smoothWithinAt_univ : SmoothWithinAt I I' f univ x ↔ SmoothAt I I' f x := contMDiffWithinAt_univ #align smooth_within_at_univ smoothWithinAt_univ theorem contMDiffOn_univ : ContMDiffOn I I' n f univ ↔ ContMDiff I I' n f := by simp only [ContMDiffOn, ContMDiff, contMDiffWithinAt_univ, forall_prop_of_true, mem_univ] #align cont_mdiff_on_univ contMDiffOn_univ theorem smoothOn_univ : SmoothOn I I' f univ ↔ Smooth I I' f := contMDiffOn_univ #align smooth_on_univ smoothOn_univ theorem contMDiffWithinAt_iff : ContMDiffWithinAt I I' n f s x ↔ ContinuousWithinAt f s x ∧ ContDiffWithinAt 𝕜 n (extChartAt I' (f x) ∘ f ∘ (extChartAt I x).symm) ((extChartAt I x).symm ⁻¹' s ∩ range I) (extChartAt I x x) := by simp_rw [ContMDiffWithinAt, liftPropWithinAt_iff']; rfl #align cont_mdiff_within_at_iff contMDiffWithinAt_iff theorem contMDiffWithinAt_iff' : ContMDiffWithinAt I I' n f s x ↔ ContinuousWithinAt f s x ∧ ContDiffWithinAt 𝕜 n (extChartAt I' (f x) ∘ f ∘ (extChartAt I x).symm) ((extChartAt I x).target ∩ (extChartAt I x).symm ⁻¹' (s ∩ f ⁻¹' (extChartAt I' (f x)).source)) (extChartAt I x x) := by simp only [ContMDiffWithinAt, liftPropWithinAt_iff'] exact and_congr_right fun hc => contDiffWithinAt_congr_nhds <\| hc.nhdsWithin_extChartAt_symm_preimage_inter_range I I' #align cont_mdiff_within_at_iff' contMDiffWithinAt_iff' theorem contMDiffWithinAt_iff_target : ContMDiffWithinAt I I' n f s x ↔ ContinuousWithinAt f s x ∧ ContMDiffWithinAt I 𝓘(𝕜, E') n (extChartAt I' (f x) ∘ f) s x := by simp_rw [ContMDiffWithinAt, liftPropWithinAt_iff', ← and_assoc] have cont : ContinuousWithinAt f s x ∧ ContinuousWithinAt (extChartAt I' (f x) ∘ f) s x ↔ ContinuousWithinAt f s x := and_iff_left_of_imp <\| (continuousAt_extChartAt _ _).comp_continuousWithinAt simp_rw [cont, ContDiffWithinAtProp, extChartAt, PartialHomeomorph.extend, PartialEquiv.coe_trans, ModelWithCorners.toPartialEquiv_coe, PartialHomeomorph.coe_coe, modelWithCornersSelf_coe, chartAt_self_eq, PartialHomeomorph.refl_apply, id_comp] rfl #align cont_mdiff_within_at_iff_target contMDiffWithinAt_iff_target theorem smoothWithinAt_iff : SmoothWithinAt I I' f s x ↔ ContinuousWithinAt f s x ∧ ContDiffWithinAt 𝕜 ∞ (extChartAt I' (f x) ∘ f ∘ (extChartAt I x).symm) ((extChartAt I x).symm ⁻¹' s ∩ range I) (extChartAt I x x) := contMDiffWithinAt_iff #align smooth_within_at_iff smoothWithinAt_iff theorem smoothWithinAt_iff_target : SmoothWithinAt I I' f s x ↔ ContinuousWithinAt f s x ∧ SmoothWithinAt I 𝓘(𝕜, E') (extChartAt I' (f x) ∘ f) s x := contMDiffWithinAt_iff_target #align smooth_within_at_iff_target smoothWithinAt_iff_target theorem contMDiffAt_iff_target {x : M} : ContMDiffAt I I' n f x ↔ ContinuousAt f x ∧ ContMDiffAt I 𝓘(𝕜, E') n (extChartAt I' (f x) ∘ f) x := by rw [ContMDiffAt, ContMDiffAt, contMDiffWithinAt_iff_target, continuousWithinAt_univ] #align cont_mdiff_at_iff_target contMDiffAt_iff_target theorem smoothAt_iff_target {x : M} : SmoothAt I I' f x ↔ ContinuousAt f x ∧ SmoothAt I 𝓘(𝕜, E') (extChartAt I' (f x) ∘ f) x := contMDiffAt_iff_target #align smooth_at_iff_target smoothAt_iff_target theorem contMDiffWithinAt_iff_of_mem_maximalAtlas {x : M} (he : e ∈ maximalAtlas I M) (he' : e' ∈ maximalAtlas I' M') (hx : x ∈ e.source) (hy : f x ∈ e'.source) : ContMDiffWithinAt I I' n f s x ↔ ContinuousWithinAt f s x ∧ ContDiffWithinAt 𝕜 n (e'.extend I' ∘ f ∘ (e.extend I).symm) ((e.extend I).symm ⁻¹' s ∩ range I) (e.extend I x) := (contDiffWithinAt_localInvariantProp I I' n).liftPropWithinAt_indep_chart he hx he' hy #align cont_mdiff_within_at_iff_of_mem_maximal_atlas contMDiffWithinAt_iff_of_mem_maximalAtlas theorem contMDiffWithinAt_iff_image {x : M} (he : e ∈ maximalAtlas I M) (he' : e' ∈ maximalAtlas I' M') (hs : s ⊆ e.source) (hx : x ∈ e.source) (hy : f x ∈ e'.source) : ContMDiffWithinAt I I' n f s x ↔ ContinuousWithinAt f s x ∧ ContDiffWithinAt 𝕜 n (e'.extend I' ∘ f ∘ (e.extend I).symm) (e.extend I '' s) (e.extend I x) := by rw [contMDiffWithinAt_iff_of_mem_maximalAtlas he he' hx hy, and_congr_right_iff] refine fun _ => contDiffWithinAt_congr_nhds ?_ simp_rw [nhdsWithin_eq_iff_eventuallyEq, e.extend_symm_preimage_inter_range_eventuallyEq I hs hx] #align cont_mdiff_within_at_iff_image contMDiffWithinAt_iff_image theorem contMDiffWithinAt_iff_of_mem_source {x' : M} {y : M'} (hx : x' ∈ (chartAt H x).source) (hy : f x' ∈ (chartAt H' y).source) : ContMDiffWithinAt I I' n f s x' ↔ ContinuousWithinAt f s x' ∧ ContDiffWithinAt 𝕜 n (extChartAt I' y ∘ f ∘ (extChartAt I x).symm) ((extChartAt I x).symm ⁻¹' s ∩ range I) (extChartAt I x x') := contMDiffWithinAt_iff_of_mem_maximalAtlas (chart_mem_maximalAtlas _ x) (chart_mem_maximalAtlas _ y) hx hy #align cont_mdiff_within_at_iff_of_mem_source contMDiffWithinAt_iff_of_mem_source theorem contMDiffWithinAt_iff_of_mem_source' {x' : M} {y : M'} (hx : x' ∈ (chartAt H x).source) (hy : f x' ∈ (chartAt H' y).source) : ContMDiffWithinAt I I' n f s x' ↔ ContinuousWithinAt f s x' ∧ ContDiffWithinAt 𝕜 n (extChartAt I' y ∘ f ∘ (extChartAt I x).symm) ((extChartAt I x).target ∩ (extChartAt I x).symm ⁻¹' (s ∩ f ⁻¹' (extChartAt I' y).source)) (extChartAt I x x') := by refine (contMDiffWithinAt_iff_of_mem_source hx hy).trans ?_ rw [← extChartAt_source I] at hx rw [← extChartAt_source I'] at hy rw [and_congr_right_iff] set e := extChartAt I x; set e' := extChartAt I' (f x) refine fun hc => contDiffWithinAt_congr_nhds ?_ rw [← e.image_source_inter_eq', ← map_extChartAt_nhdsWithin_eq_image' I hx, ← map_extChartAt_nhdsWithin' I hx, inter_comm, nhdsWithin_inter_of_mem] exact hc (extChartAt_source_mem_nhds' _ hy) #align cont_mdiff_within_at_iff_of_mem_source' contMDiffWithinAt_iff_of_mem_source' theorem contMDiffAt_iff_of_mem_source {x' : M} {y : M'} (hx : x' ∈ (chartAt H x).source) (hy : f x' ∈ (chartAt H' y).source) : ContMDiffAt I I' n f x' ↔ ContinuousAt f x' ∧ ContDiffWithinAt 𝕜 n (extChartAt I' y ∘ f ∘ (extChartAt I x).symm) (range I) (extChartAt I x x') := (contMDiffWithinAt_iff_of_mem_source hx hy).trans <\| by rw [continuousWithinAt_univ, preimage_univ, univ_inter] #align cont_mdiff_at_iff_of_mem_source contMDiffAt_iff_of_mem_source theorem contMDiffWithinAt_iff_target_of_mem_source {x : M} {y : M'} (hy : f x ∈ (chartAt H' y).source) : ContMDiffWithinAt I I' n f s x ↔ ContinuousWithinAt f s x ∧ ContMDiffWithinAt I 𝓘(𝕜, E') n (extChartAt I' y ∘ f) s x := by simp_rw [ContMDiffWithinAt] rw [(contDiffWithinAt_localInvariantProp I I' n).liftPropWithinAt_indep_chart_target (chart_mem_maximalAtlas I' y) hy, and_congr_right] intro hf simp_rw [StructureGroupoid.liftPropWithinAt_self_target] simp_rw [((chartAt H' y).continuousAt hy).comp_continuousWithinAt hf] rw [← extChartAt_source I'] at hy simp_rw [(continuousAt_extChartAt' I' hy).comp_continuousWithinAt hf] rfl #align cont_mdiff_within_at_iff_target_of_mem_source contMDiffWithinAt_iff_target_of_mem_source theorem contMDiffAt_iff_target_of_mem_source {x : M} {y : M'} (hy : f x ∈ (chartAt H' y).source) : ContMDiffAt I I' n f x ↔ ContinuousAt f x ∧ ContMDiffAt I 𝓘(𝕜, E') n (extChartAt I' y ∘ f) x := by rw [ContMDiffAt, contMDiffWithinAt_iff_target_of_mem_source hy, continuousWithinAt_univ, ContMDiffAt] #align cont_mdiff_at_iff_target_of_mem_source contMDiffAt_iff_target_of_mem_source theorem contMDiffWithinAt_iff_source_of_mem_maximalAtlas (he : e ∈ maximalAtlas I M) (hx : x ∈ e.source) : ContMDiffWithinAt I I' n f s x ↔ ContMDiffWithinAt 𝓘(𝕜, E) I' n (f ∘ (e.extend I).symm) ((e.extend I).symm ⁻¹' s ∩ range I) (e.extend I x) := by have h2x := hx; rw [← e.extend_source I] at h2x simp_rw [ContMDiffWithinAt, (contDiffWithinAt_localInvariantProp I I' n).liftPropWithinAt_indep_chart_source he hx, StructureGroupoid.liftPropWithinAt_self_source, e.extend_symm_continuousWithinAt_comp_right_iff, contDiffWithinAtProp_self_source, ContDiffWithinAtProp, Function.comp, e.left_inv hx, (e.extend I).left_inv h2x] rfl #align cont_mdiff_within_at_iff_source_of_mem_maximal_atlas contMDiffWithinAt_iff_source_of_mem_maximalAtlas theorem contMDiffWithinAt_iff_source_of_mem_source {x' : M} (hx' : x' ∈ (chartAt H x).source) : ContMDiffWithinAt I I' n f s x' ↔ ContMDiffWithinAt 𝓘(𝕜, E) I' n (f ∘ (extChartAt I x).symm) ((extChartAt I x).symm ⁻¹' s ∩ range I) (extChartAt I x x') := contMDiffWithinAt_iff_source_of_mem_maximalAtlas (chart_mem_maximalAtlas I x) hx' #align cont_mdiff_within_at_iff_source_of_mem_source contMDiffWithinAt_iff_source_of_mem_source theorem contMDiffAt_iff_source_of_mem_source {x' : M} (hx' : x' ∈ (chartAt H x).source) : ContMDiffAt I I' n f x' ↔ ContMDiffWithinAt 𝓘(𝕜, E) I' n (f ∘ (extChartAt I x).symm) (range I) (extChartAt I x x') := by simp_rw [ContMDiffAt, contMDiffWithinAt_iff_source_of_mem_source hx', preimage_univ, univ_inter] #align cont_mdiff_at_iff_source_of_mem_source contMDiffAt_iff_source_of_mem_source theorem contMDiffOn_iff_of_mem_maximalAtlas (he : e ∈ maximalAtlas I M) (he' : e' ∈ maximalAtlas I' M') (hs : s ⊆ e.source) (h2s : MapsTo f s e'.source) : ContMDiffOn I I' n f s ↔ ContinuousOn f s ∧ ContDiffOn 𝕜 n (e'.extend I' ∘ f ∘ (e.extend I).symm) (e.extend I '' s) := by simp_rw [ContinuousOn, ContDiffOn, Set.forall_mem_image, ← forall_and, ContMDiffOn] exact forall₂_congr fun x hx => contMDiffWithinAt_iff_image he he' hs (hs hx) (h2s hx) #align cont_mdiff_on_iff_of_mem_maximal_atlas contMDiffOn_iff_of_mem_maximalAtlas theorem contMDiffOn_iff_of_mem_maximalAtlas' (he : e ∈ maximalAtlas I M) (he' : e' ∈ maximalAtlas I' M') (hs : s ⊆ e.source) (h2s : MapsTo f s e'.source) : ContMDiffOn I I' n f s ↔ ContDiffOn 𝕜 n (e'.extend I' ∘ f ∘ (e.extend I).symm) (e.extend I '' s) := (contMDiffOn_iff_of_mem_maximalAtlas he he' hs h2s).trans <\| and_iff_right_of_imp fun h ↦ (e.continuousOn_writtenInExtend_iff _ _ hs h2s).1 h.continuousOn theorem contMDiffOn_iff_of_subset_source {x : M} {y : M'} (hs : s ⊆ (chartAt H x).source) (h2s : MapsTo f s (chartAt H' y).source) : ContMDiffOn I I' n f s ↔ ContinuousOn f s ∧ ContDiffOn 𝕜 n (extChartAt I' y ∘ f ∘ (extChartAt I x).symm) (extChartAt I x '' s) := contMDiffOn_iff_of_mem_maximalAtlas (chart_mem_maximalAtlas I x) (chart_mem_maximalAtlas I' y) hs h2s #align cont_mdiff_on_iff_of_subset_source contMDiffOn_iff_of_subset_source theorem contMDiffOn_iff_of_subset_source' {x : M} {y : M'} (hs : s ⊆ (extChartAt I x).source) (h2s : MapsTo f s (extChartAt I' y).source) : ContMDiffOn I I' n f s ↔ ContDiffOn 𝕜 n (extChartAt I' y ∘ f ∘ (extChartAt I x).symm) (extChartAt I x '' s) := by rw [extChartAt_source] at hs h2s exact contMDiffOn_iff_of_mem_maximalAtlas' (chart_mem_maximalAtlas I x) (chart_mem_maximalAtlas I' y) hs h2s theorem contMDiffOn_iff : ContMDiffOn I I' n f s ↔ ContinuousOn f s ∧ ∀ (x : M) (y : M'), ContDiffOn 𝕜 n (extChartAt I' y ∘ f ∘ (extChartAt I x).symm) ((extChartAt I x).target ∩ (extChartAt I x).symm ⁻¹' (s ∩ f ⁻¹' (extChartAt I' y).source)) := by constructor · intro h refine ⟨fun x hx => (h x hx).1, fun x y z hz => ?_⟩ simp only [mfld_simps] at hz let w := (extChartAt I x).symm z have : w ∈ s := by simp only [w, hz, mfld_simps] specialize h w this have w1 : w ∈ (chartAt H x).source := by simp only [w, hz, mfld_simps] have w2 : f w ∈ (chartAt H' y).source := by simp only [w, hz, mfld_simps] convert ((contMDiffWithinAt_iff_of_mem_source w1 w2).mp h).2.mono _ · simp only [w, hz, mfld_simps] · mfld_set_tac · rintro ⟨hcont, hdiff⟩ x hx refine (contDiffWithinAt_localInvariantProp I I' n).liftPropWithinAt_iff.mpr ?_ refine ⟨hcont x hx, ?_⟩ dsimp [ContDiffWithinAtProp] convert hdiff x (f x) (extChartAt I x x) (by simp only [hx, mfld_simps]) using 1 mfld_set_tac #align cont_mdiff_on_iff contMDiffOn_iff theorem contMDiffOn_iff_target : ContMDiffOn I I' n f s ↔ ContinuousOn f s ∧ ∀ y : M', ContMDiffOn I 𝓘(𝕜, E') n (extChartAt I' y ∘ f) (s ∩ f ⁻¹' (extChartAt I' y).source) := by simp only [contMDiffOn_iff, ModelWithCorners.source_eq, chartAt_self_eq, PartialHomeomorph.refl_partialEquiv, PartialEquiv.refl_trans, extChartAt, PartialHomeomorph.extend, Set.preimage_univ, Set.inter_univ, and_congr_right_iff] intro h constructor · refine fun h' y => ⟨?_, fun x _ => h' x y⟩ have h'' : ContinuousOn _ univ := (ModelWithCorners.continuous I').continuousOn convert (h''.comp' (chartAt H' y).continuousOn_toFun).comp' h simp · exact fun h' x y => (h' y).2 x 0 #align cont_mdiff_on_iff_target contMDiffOn_iff_target theorem smoothOn_iff : SmoothOn I I' f s ↔ ContinuousOn f s ∧ ∀ (x : M) (y : M'), ContDiffOn 𝕜 ⊤ (extChartAt I' y ∘ f ∘ (extChartAt I x).symm) ((extChartAt I x).target ∩ (extChartAt I x).symm ⁻¹' (s ∩ f ⁻¹' (extChartAt I' y).source)) := contMDiffOn_iff #align smooth_on_iff smoothOn_iff theorem smoothOn_iff_target : SmoothOn I I' f s ↔ ContinuousOn f s ∧ ∀ y : M', SmoothOn I 𝓘(𝕜, E') (extChartAt I' y ∘ f) (s ∩ f ⁻¹' (extChartAt I' y).source) := contMDiffOn_iff_target #align smooth_on_iff_target smoothOn_iff_target theorem contMDiff_iff : ContMDiff I I' n f ↔ Continuous f ∧ ∀ (x : M) (y : M'), ContDiffOn 𝕜 n (extChartAt I' y ∘ f ∘ (extChartAt I x).symm) ((extChartAt I x).target ∩ (extChartAt I x).symm ⁻¹' (f ⁻¹' (extChartAt I' y).source)) := by simp [← contMDiffOn_univ, contMDiffOn_iff, continuous_iff_continuousOn_univ] #align cont_mdiff_iff contMDiff_iff theorem contMDiff_iff_target : ContMDiff I I' n f ↔ Continuous f ∧ ∀ y : M', ContMDiffOn I 𝓘(𝕜, E') n (extChartAt I' y ∘ f) (f ⁻¹' (extChartAt I' y).source) := by rw [← contMDiffOn_univ, contMDiffOn_iff_target] simp [continuous_iff_continuousOn_univ] #align cont_mdiff_iff_target contMDiff_iff_target theorem smooth_iff : Smooth I I' f ↔ Continuous f ∧ ∀ (x : M) (y : M'), ContDiffOn 𝕜 ⊤ (extChartAt I' y ∘ f ∘ (extChartAt I x).symm) ((extChartAt I x).target ∩ (extChartAt I x).symm ⁻¹' (f ⁻¹' (extChartAt I' y).source)) := contMDiff_iff #align smooth_iff smooth_iff theorem smooth_iff_target : Smooth I I' f ↔ Continuous f ∧ ∀ y : M', SmoothOn I 𝓘(𝕜, E') (extChartAt I' y ∘ f) (f ⁻¹' (extChartAt I' y).source) := contMDiff_iff_target #align smooth_iff_target smooth_iff_target theorem ContMDiffWithinAt.of_succ {n : ℕ} (h : ContMDiffWithinAt I I' n.succ f s x) : ContMDiffWithinAt I I' n f s x := h.of_le (WithTop.coe_le_coe.2 (Nat.le_succ n)) #align cont_mdiff_within_at.of_succ ContMDiffWithinAt.of_succ theorem ContMDiffAt.of_succ {n : ℕ} (h : ContMDiffAt I I' n.succ f x) : ContMDiffAt I I' n f x := ContMDiffWithinAt.of_succ h #align cont_mdiff_at.of_succ ContMDiffAt.of_succ theorem ContMDiffOn.of_succ {n : ℕ} (h : ContMDiffOn I I' n.succ f s) : ContMDiffOn I I' n f s := fun x hx => (h x hx).of_succ #align cont_mdiff_on.of_succ ContMDiffOn.of_succ theorem ContMDiff.of_succ {n : ℕ} (h : ContMDiff I I' n.succ f) : ContMDiff I I' n f := fun x => (h x).of_succ #align cont_mdiff.of_succ ContMDiff.of_succ theorem ContMDiffWithinAt.continuousWithinAt (hf : ContMDiffWithinAt I I' n f s x) : ContinuousWithinAt f s x := hf.1 #align cont_mdiff_within_at.continuous_within_at ContMDiffWithinAt.continuousWithinAt theorem ContMDiffAt.continuousAt (hf : ContMDiffAt I I' n f x) : ContinuousAt f x := (continuousWithinAt_univ _ _).1 <\| ContMDiffWithinAt.continuousWithinAt hf #align cont_mdiff_at.continuous_at ContMDiffAt.continuousAt theorem ContMDiffOn.continuousOn (hf : ContMDiffOn I I' n f s) : ContinuousOn f s := fun x hx => (hf x hx).continuousWithinAt #align cont_mdiff_on.continuous_on ContMDiffOn.continuousOn theorem ContMDiff.continuous (hf : ContMDiff I I' n f) : Continuous f := continuous_iff_continuousAt.2 fun x => (hf x).continuousAt #align cont_mdiff.continuous ContMDiff.continuous theorem contMDiffWithinAt_top : SmoothWithinAt I I' f s x ↔ ∀ n : ℕ, ContMDiffWithinAt I I' n f s x := ⟨fun h n => ⟨h.1, contDiffWithinAt_top.1 h.2 n⟩, fun H => ⟨(H 0).1, contDiffWithinAt_top.2 fun n => (H n).2⟩⟩ #align cont_mdiff_within_at_top contMDiffWithinAt_top theorem contMDiffAt_top : SmoothAt I I' f x ↔ ∀ n : ℕ, ContMDiffAt I I' n f x := contMDiffWithinAt_top #align cont_mdiff_at_top contMDiffAt_top theorem contMDiffOn_top : SmoothOn I I' f s ↔ ∀ n : ℕ, ContMDiffOn I I' n f s := ⟨fun h _ => h.of_le le_top, fun h x hx => contMDiffWithinAt_top.2 fun n => h n x hx⟩ #align cont_mdiff_on_top contMDiffOn_top theorem contMDiff_top : Smooth I I' f ↔ ∀ n : ℕ, ContMDiff I I' n f := ⟨fun h _ => h.of_le le_top, fun h x => contMDiffWithinAt_top.2 fun n => h n x⟩ #align cont_mdiff_top contMDiff_top theorem contMDiffWithinAt_iff_nat : ContMDiffWithinAt I I' n f s x ↔ ∀ m : ℕ, (m : ℕ∞) ≤ n → ContMDiffWithinAt I I' m f s x := by refine ⟨fun h m hm => h.of_le hm, fun h => ?_⟩ cases' n with n · exact contMDiffWithinAt_top.2 fun n => h n le_top · exact h n le_rfl #align cont_mdiff_within_at_iff_nat contMDiffWithinAt_iff_nat theorem ContMDiffWithinAt.mono_of_mem (hf : ContMDiffWithinAt I I' n f s x) (hts : s ∈ 𝓝[t] x) : ContMDiffWithinAt I I' n f t x := StructureGroupoid.LocalInvariantProp.liftPropWithinAt_mono_of_mem (contDiffWithinAtProp_mono_of_mem I I' n) hf hts #align cont_mdiff_within_at.mono_of_mem ContMDiffWithinAt.mono_of_mem theorem ContMDiffWithinAt.mono (hf : ContMDiffWithinAt I I' n f s x) (hts : t ⊆ s) : ContMDiffWithinAt I I' n f t x := hf.mono_of_mem <\| mem_of_superset self_mem_nhdsWithin hts #align cont_mdiff_within_at.mono ContMDiffWithinAt.mono theorem contMDiffWithinAt_congr_nhds (hst : 𝓝[s] x = 𝓝[t] x) : ContMDiffWithinAt I I' n f s x ↔ ContMDiffWithinAt I I' n f t x := ⟨fun h => h.mono_of_mem <\| hst ▸ self_mem_nhdsWithin, fun h => h.mono_of_mem <\| hst.symm ▸ self_mem_nhdsWithin⟩ #align cont_mdiff_within_at_congr_nhds contMDiffWithinAt_congr_nhds theorem contMDiffWithinAt_insert_self : ContMDiffWithinAt I I' n f (insert x s) x ↔ ContMDiffWithinAt I I' n f s x := by simp only [contMDiffWithinAt_iff, continuousWithinAt_insert_self] refine Iff.rfl.and <\| (contDiffWithinAt_congr_nhds ?_).trans contDiffWithinAt_insert_self simp only [← map_extChartAt_nhdsWithin I, nhdsWithin_insert, Filter.map_sup, Filter.map_pure] alias ⟨ContMDiffWithinAt.of_insert, _⟩ := contMDiffWithinAt_insert_self -- TODO: use `alias` again once it can make protected theorems theorem ContMDiffWithinAt.insert (h : ContMDiffWithinAt I I' n f s x) : ContMDiffWithinAt I I' n f (insert x s) x := contMDiffWithinAt_insert_self.2 h theorem ContMDiffAt.contMDiffWithinAt (hf : ContMDiffAt I I' n f x) : ContMDiffWithinAt I I' n f s x := ContMDiffWithinAt.mono hf (subset_univ _) #align cont_mdiff_at.cont_mdiff_within_at ContMDiffAt.contMDiffWithinAt theorem SmoothAt.smoothWithinAt (hf : SmoothAt I I' f x) : SmoothWithinAt I I' f s x := ContMDiffAt.contMDiffWithinAt hf #align smooth_at.smooth_within_at SmoothAt.smoothWithinAt theorem ContMDiffOn.mono (hf : ContMDiffOn I I' n f s) (hts : t ⊆ s) : ContMDiffOn I I' n f t := fun x hx => (hf x (hts hx)).mono hts #align cont_mdiff_on.mono ContMDiffOn.mono theorem ContMDiff.contMDiffOn (hf : ContMDiff I I' n f) : ContMDiffOn I I' n f s := fun x _ => (hf x).contMDiffWithinAt #align cont_mdiff.cont_mdiff_on ContMDiff.contMDiffOn theorem Smooth.smoothOn (hf : Smooth I I' f) : SmoothOn I I' f s := ContMDiff.contMDiffOn hf #align smooth.smooth_on Smooth.smoothOn theorem contMDiffWithinAt_inter' (ht : t ∈ 𝓝[s] x) : ContMDiffWithinAt I I' n f (s ∩ t) x ↔ ContMDiffWithinAt I I' n f s x := (contDiffWithinAt_localInvariantProp I I' n).liftPropWithinAt_inter' ht #align cont_mdiff_within_at_inter' contMDiffWithinAt_inter' theorem contMDiffWithinAt_inter (ht : t ∈ 𝓝 x) : ContMDiffWithinAt I I' n f (s ∩ t) x ↔ ContMDiffWithinAt I I' n f s x := (contDiffWithinAt_localInvariantProp I I' n).liftPropWithinAt_inter ht #align cont_mdiff_within_at_inter contMDiffWithinAt_inter theorem ContMDiffWithinAt.contMDiffAt (h : ContMDiffWithinAt I I' n f s x) (ht : s ∈ 𝓝 x) : ContMDiffAt I I' n f x := (contDiffWithinAt_localInvariantProp I I' n).liftPropAt_of_liftPropWithinAt h ht #align cont_mdiff_within_at.cont_mdiff_at ContMDiffWithinAt.contMDiffAt theorem SmoothWithinAt.smoothAt (h : SmoothWithinAt I I' f s x) (ht : s ∈ 𝓝 x) : SmoothAt I I' f x := ContMDiffWithinAt.contMDiffAt h ht #align smooth_within_at.smooth_at SmoothWithinAt.smoothAt theorem ContMDiffOn.contMDiffAt (h : ContMDiffOn I I' n f s) (hx : s ∈ 𝓝 x) : ContMDiffAt I I' n f x := (h x (mem_of_mem_nhds hx)).contMDiffAt hx #align cont_mdiff_on.cont_mdiff_at ContMDiffOn.contMDiffAt theorem SmoothOn.smoothAt (h : SmoothOn I I' f s) (hx : s ∈ 𝓝 x) : SmoothAt I I' f x := h.contMDiffAt hx #align smooth_on.smooth_at SmoothOn.smoothAt	Mathlib/Geometry/Manifold/ContMDiff/Defs.lean	796	804	theorem contMDiffOn_iff_source_of_mem_maximalAtlas (he : e ∈ maximalAtlas I M) (hs : s ⊆ e.source) : ContMDiffOn I I' n f s ↔ ContMDiffOn 𝓘(𝕜, E) I' n (f ∘ (e.extend I).symm) (e.extend I '' s) := by	simp_rw [ContMDiffOn, Set.forall_mem_image] refine forall₂_congr fun x hx => ?_ rw [contMDiffWithinAt_iff_source_of_mem_maximalAtlas he (hs hx)] apply contMDiffWithinAt_congr_nhds simp_rw [nhdsWithin_eq_iff_eventuallyEq, e.extend_symm_preimage_inter_range_eventuallyEq I hs (hs hx)]
import Mathlib.Algebra.DirectSum.Internal import Mathlib.Algebra.GradedMonoid import Mathlib.Algebra.MvPolynomial.CommRing import Mathlib.Algebra.MvPolynomial.Equiv import Mathlib.Algebra.MvPolynomial.Variables import Mathlib.RingTheory.MvPolynomial.WeightedHomogeneous import Mathlib.Algebra.Polynomial.Roots #align_import ring_theory.mv_polynomial.homogeneous from "leanprover-community/mathlib"@"2f5b500a507264de86d666a5f87ddb976e2d8de4" namespace MvPolynomial variable {σ : Type} {τ : Type} {R : Type} {S : Type} def degree (d : σ →₀ ℕ) := ∑ i ∈ d.support, d i theorem weightedDegree_one (d : σ →₀ ℕ) : weightedDegree 1 d = degree d := by simp [weightedDegree, degree, Finsupp.total, Finsupp.sum] def IsHomogeneous [CommSemiring R] (φ : MvPolynomial σ R) (n : ℕ) := IsWeightedHomogeneous 1 φ n #align mv_polynomial.is_homogeneous MvPolynomial.IsHomogeneous variable [CommSemiring R] theorem weightedTotalDegree_one (φ : MvPolynomial σ R) : weightedTotalDegree (1 : σ → ℕ) φ = φ.totalDegree := by simp only [totalDegree, weightedTotalDegree, weightedDegree, LinearMap.toAddMonoidHom_coe, Finsupp.total, Pi.one_apply, Finsupp.coe_lsum, LinearMap.coe_smulRight, LinearMap.id_coe, id, Algebra.id.smul_eq_mul, mul_one] variable (σ R) def homogeneousSubmodule (n : ℕ) : Submodule R (MvPolynomial σ R) where carrier := { x \| x.IsHomogeneous n } smul_mem' r a ha c hc := by rw [coeff_smul] at hc apply ha intro h apply hc rw [h] exact smul_zero r zero_mem' d hd := False.elim (hd <\| coeff_zero _) add_mem' {a b} ha hb c hc := by rw [coeff_add] at hc obtain h \| h : coeff c a ≠ 0 ∨ coeff c b ≠ 0 := by contrapose! hc simp only [hc, add_zero] · exact ha h · exact hb h #align mv_polynomial.homogeneous_submodule MvPolynomial.homogeneousSubmodule @[simp] lemma weightedHomogeneousSubmodule_one (n : ℕ) : weightedHomogeneousSubmodule R 1 n = homogeneousSubmodule σ R n := rfl variable {σ R} @[simp] theorem mem_homogeneousSubmodule [CommSemiring R] (n : ℕ) (p : MvPolynomial σ R) : p ∈ homogeneousSubmodule σ R n ↔ p.IsHomogeneous n := Iff.rfl #align mv_polynomial.mem_homogeneous_submodule MvPolynomial.mem_homogeneousSubmodule variable (σ R) theorem homogeneousSubmodule_eq_finsupp_supported [CommSemiring R] (n : ℕ) : homogeneousSubmodule σ R n = Finsupp.supported _ R { d \| degree d = n } := by simp_rw [← weightedDegree_one] exact weightedHomogeneousSubmodule_eq_finsupp_supported R 1 n #align mv_polynomial.homogeneous_submodule_eq_finsupp_supported MvPolynomial.homogeneousSubmodule_eq_finsupp_supported variable {σ R} theorem homogeneousSubmodule_mul [CommSemiring R] (m n : ℕ) : homogeneousSubmodule σ R m * homogeneousSubmodule σ R n ≤ homogeneousSubmodule σ R (m + n) := weightedHomogeneousSubmodule_mul 1 m n #align mv_polynomial.homogeneous_submodule_mul MvPolynomial.homogeneousSubmodule_mul section variable [CommSemiring R]	Mathlib/RingTheory/MvPolynomial/Homogeneous.lean	116	119	theorem isHomogeneous_monomial {d : σ →₀ ℕ} (r : R) {n : ℕ} (hn : degree d = n) : IsHomogeneous (monomial d r) n := by	simp_rw [← weightedDegree_one] at hn exact isWeightedHomogeneous_monomial 1 d r hn
import Mathlib.Algebra.CharZero.Lemmas import Mathlib.Order.Interval.Finset.Basic #align_import data.int.interval from "leanprover-community/mathlib"@"1d29de43a5ba4662dd33b5cfeecfc2a27a5a8a29" open Finset Int namespace Int instance instLocallyFiniteOrder : LocallyFiniteOrder ℤ where finsetIcc a b := (Finset.range (b + 1 - a).toNat).map <\| Nat.castEmbedding.trans <\| addLeftEmbedding a finsetIco a b := (Finset.range (b - a).toNat).map <\| Nat.castEmbedding.trans <\| addLeftEmbedding a finsetIoc a b := (Finset.range (b - a).toNat).map <\| Nat.castEmbedding.trans <\| addLeftEmbedding (a + 1) finsetIoo a b := (Finset.range (b - a - 1).toNat).map <\| Nat.castEmbedding.trans <\| addLeftEmbedding (a + 1) finset_mem_Icc a b x := by simp_rw [mem_map, mem_range, Int.lt_toNat, Function.Embedding.trans_apply, Nat.castEmbedding_apply, addLeftEmbedding_apply] constructor · rintro ⟨a, h, rfl⟩ rw [lt_sub_iff_add_lt, Int.lt_add_one_iff, add_comm] at h exact ⟨Int.le.intro a rfl, h⟩ · rintro ⟨ha, hb⟩ use (x - a).toNat rw [← lt_add_one_iff] at hb rw [toNat_sub_of_le ha] exact ⟨sub_lt_sub_right hb _, add_sub_cancel _ _⟩ finset_mem_Ico a b x := by simp_rw [mem_map, mem_range, Int.lt_toNat, Function.Embedding.trans_apply, Nat.castEmbedding_apply, addLeftEmbedding_apply] constructor · rintro ⟨a, h, rfl⟩ exact ⟨Int.le.intro a rfl, lt_sub_iff_add_lt'.mp h⟩ · rintro ⟨ha, hb⟩ use (x - a).toNat rw [toNat_sub_of_le ha] exact ⟨sub_lt_sub_right hb _, add_sub_cancel _ _⟩ finset_mem_Ioc a b x := by simp_rw [mem_map, mem_range, Int.lt_toNat, Function.Embedding.trans_apply, Nat.castEmbedding_apply, addLeftEmbedding_apply] constructor · rintro ⟨a, h, rfl⟩ rw [← add_one_le_iff, le_sub_iff_add_le', add_comm _ (1 : ℤ), ← add_assoc] at h exact ⟨Int.le.intro a rfl, h⟩ · rintro ⟨ha, hb⟩ use (x - (a + 1)).toNat rw [toNat_sub_of_le ha, ← add_one_le_iff, sub_add, add_sub_cancel_right] exact ⟨sub_le_sub_right hb _, add_sub_cancel _ _⟩ finset_mem_Ioo a b x := by simp_rw [mem_map, mem_range, Int.lt_toNat, Function.Embedding.trans_apply, Nat.castEmbedding_apply, addLeftEmbedding_apply] constructor · rintro ⟨a, h, rfl⟩ rw [sub_sub, lt_sub_iff_add_lt'] at h exact ⟨Int.le.intro a rfl, h⟩ · rintro ⟨ha, hb⟩ use (x - (a + 1)).toNat rw [toNat_sub_of_le ha, sub_sub] exact ⟨sub_lt_sub_right hb _, add_sub_cancel _ _⟩ variable (a b : ℤ) theorem Icc_eq_finset_map : Icc a b = (Finset.range (b + 1 - a).toNat).map (Nat.castEmbedding.trans <\| addLeftEmbedding a) := rfl #align int.Icc_eq_finset_map Int.Icc_eq_finset_map theorem Ico_eq_finset_map : Ico a b = (Finset.range (b - a).toNat).map (Nat.castEmbedding.trans <\| addLeftEmbedding a) := rfl #align int.Ico_eq_finset_map Int.Ico_eq_finset_map theorem Ioc_eq_finset_map : Ioc a b = (Finset.range (b - a).toNat).map (Nat.castEmbedding.trans <\| addLeftEmbedding (a + 1)) := rfl #align int.Ioc_eq_finset_map Int.Ioc_eq_finset_map theorem Ioo_eq_finset_map : Ioo a b = (Finset.range (b - a - 1).toNat).map (Nat.castEmbedding.trans <\| addLeftEmbedding (a + 1)) := rfl #align int.Ioo_eq_finset_map Int.Ioo_eq_finset_map theorem uIcc_eq_finset_map : uIcc a b = (range (max a b + 1 - min a b).toNat).map (Nat.castEmbedding.trans <\| addLeftEmbedding <\| min a b) := rfl #align int.uIcc_eq_finset_map Int.uIcc_eq_finset_map @[simp] theorem card_Icc : (Icc a b).card = (b + 1 - a).toNat := (card_map _).trans <\| card_range _ #align int.card_Icc Int.card_Icc @[simp] theorem card_Ico : (Ico a b).card = (b - a).toNat := (card_map _).trans <\| card_range _ #align int.card_Ico Int.card_Ico @[simp] theorem card_Ioc : (Ioc a b).card = (b - a).toNat := (card_map _).trans <\| card_range _ #align int.card_Ioc Int.card_Ioc @[simp] theorem card_Ioo : (Ioo a b).card = (b - a - 1).toNat := (card_map _).trans <\| card_range _ #align int.card_Ioo Int.card_Ioo @[simp] theorem card_uIcc : (uIcc a b).card = (b - a).natAbs + 1 := (card_map _).trans <\| Int.ofNat.inj <\| by -- Porting note (#11215): TODO: Restore `int.coe_nat_inj` and remove the `change` change ((↑) : ℕ → ℤ) _ = ((↑) : ℕ → ℤ) _ rw [card_range, sup_eq_max, inf_eq_min, Int.toNat_of_nonneg (sub_nonneg_of_le <\| le_add_one min_le_max), Int.ofNat_add, Int.natCast_natAbs, add_comm, add_sub_assoc, max_sub_min_eq_abs, add_comm, Int.ofNat_one] #align int.card_uIcc Int.card_uIcc theorem card_Icc_of_le (h : a ≤ b + 1) : ((Icc a b).card : ℤ) = b + 1 - a := by rw [card_Icc, toNat_sub_of_le h] #align int.card_Icc_of_le Int.card_Icc_of_le theorem card_Ico_of_le (h : a ≤ b) : ((Ico a b).card : ℤ) = b - a := by rw [card_Ico, toNat_sub_of_le h] #align int.card_Ico_of_le Int.card_Ico_of_le theorem card_Ioc_of_le (h : a ≤ b) : ((Ioc a b).card : ℤ) = b - a := by rw [card_Ioc, toNat_sub_of_le h] #align int.card_Ioc_of_le Int.card_Ioc_of_le	Mathlib/Data/Int/Interval.lean	145	146	theorem card_Ioo_of_lt (h : a < b) : ((Ioo a b).card : ℤ) = b - a - 1 := by	rw [card_Ioo, sub_sub, toNat_sub_of_le h]
import Mathlib.Analysis.Calculus.ContDiff.Basic import Mathlib.Data.Finset.Sym import Mathlib.Data.Nat.Choose.Cast import Mathlib.Data.Nat.Choose.Multinomial #align_import analysis.calculus.cont_diff from "leanprover-community/mathlib"@"3bce8d800a6f2b8f63fe1e588fd76a9ff4adcebe" noncomputable section open scoped Classical NNReal Nat universe u uD uE uF uG open Set Fin Filter Function variable {𝕜 : Type} [NontriviallyNormedField 𝕜] {D : Type uD} [NormedAddCommGroup D] [NormedSpace 𝕜 D] {E : Type uE} [NormedAddCommGroup E] [NormedSpace 𝕜 E] {F : Type uF} [NormedAddCommGroup F] [NormedSpace 𝕜 F] {G : Type uG} [NormedAddCommGroup G] [NormedSpace 𝕜 G] {s s₁ t u : Set E} theorem ContinuousLinearMap.norm_iteratedFDerivWithin_le_of_bilinear_aux {Du Eu Fu Gu : Type u} [NormedAddCommGroup Du] [NormedSpace 𝕜 Du] [NormedAddCommGroup Eu] [NormedSpace 𝕜 Eu] [NormedAddCommGroup Fu] [NormedSpace 𝕜 Fu] [NormedAddCommGroup Gu] [NormedSpace 𝕜 Gu] (B : Eu →L[𝕜] Fu →L[𝕜] Gu) {f : Du → Eu} {g : Du → Fu} {n : ℕ} {s : Set Du} {x : Du} (hf : ContDiffOn 𝕜 n f s) (hg : ContDiffOn 𝕜 n g s) (hs : UniqueDiffOn 𝕜 s) (hx : x ∈ s) : ‖iteratedFDerivWithin 𝕜 n (fun y => B (f y) (g y)) s x‖ ≤ ‖B‖ ∑ i ∈ Finset.range (n + 1), (n.choose i : ℝ) * ‖iteratedFDerivWithin 𝕜 i f s x‖ * ‖iteratedFDerivWithin 𝕜 (n - i) g s x‖ := by induction' n with n IH generalizing Eu Fu Gu · simp only [Nat.zero_eq, norm_iteratedFDerivWithin_zero, zero_add, Finset.range_one, Finset.sum_singleton, Nat.choose_self, Nat.cast_one, one_mul, Nat.sub_zero, ← mul_assoc] apply B.le_opNorm₂ · have In : (n : ℕ∞) + 1 ≤ n.succ := by simp only [Nat.cast_succ, le_refl] -- Porting note: the next line is a hack allowing Lean to find the operator norm instance. let norm := @ContinuousLinearMap.hasOpNorm _ _ Eu ((Du →L[𝕜] Fu) →L[𝕜] Du →L[𝕜] Gu) _ _ _ _ _ _ (RingHom.id 𝕜) have I1 : ‖iteratedFDerivWithin 𝕜 n (fun y : Du => B.precompR Du (f y) (fderivWithin 𝕜 g s y)) s x‖ ≤ ‖B‖ * ∑ i ∈ Finset.range (n + 1), n.choose i * ‖iteratedFDerivWithin 𝕜 i f s x‖ * ‖iteratedFDerivWithin 𝕜 (n + 1 - i) g s x‖ := by calc ‖iteratedFDerivWithin 𝕜 n (fun y : Du => B.precompR Du (f y) (fderivWithin 𝕜 g s y)) s x‖ ≤ ‖B.precompR Du‖ * ∑ i ∈ Finset.range (n + 1), n.choose i * ‖iteratedFDerivWithin 𝕜 i f s x‖ * ‖iteratedFDerivWithin 𝕜 (n - i) (fderivWithin 𝕜 g s) s x‖ := IH _ (hf.of_le (Nat.cast_le.2 (Nat.le_succ n))) (hg.fderivWithin hs In) _ ≤ ‖B‖ * ∑ i ∈ Finset.range (n + 1), n.choose i * ‖iteratedFDerivWithin 𝕜 i f s x‖ * ‖iteratedFDerivWithin 𝕜 (n - i) (fderivWithin 𝕜 g s) s x‖ := mul_le_mul_of_nonneg_right (B.norm_precompR_le Du) (by positivity) _ = _ := by congr 1 apply Finset.sum_congr rfl fun i hi => ?_ rw [Nat.succ_sub (Nat.lt_succ_iff.1 (Finset.mem_range.1 hi)), ← norm_iteratedFDerivWithin_fderivWithin hs hx] -- Porting note: the next line is a hack allowing Lean to find the operator norm instance. let norm := @ContinuousLinearMap.hasOpNorm _ _ (Du →L[𝕜] Eu) (Fu →L[𝕜] Du →L[𝕜] Gu) _ _ _ _ _ _ (RingHom.id 𝕜) have I2 : ‖iteratedFDerivWithin 𝕜 n (fun y : Du => B.precompL Du (fderivWithin 𝕜 f s y) (g y)) s x‖ ≤ ‖B‖ * ∑ i ∈ Finset.range (n + 1), n.choose i * ‖iteratedFDerivWithin 𝕜 (i + 1) f s x‖ * ‖iteratedFDerivWithin 𝕜 (n - i) g s x‖ := calc ‖iteratedFDerivWithin 𝕜 n (fun y : Du => B.precompL Du (fderivWithin 𝕜 f s y) (g y)) s x‖ ≤ ‖B.precompL Du‖ * ∑ i ∈ Finset.range (n + 1), n.choose i * ‖iteratedFDerivWithin 𝕜 i (fderivWithin 𝕜 f s) s x‖ * ‖iteratedFDerivWithin 𝕜 (n - i) g s x‖ := IH _ (hf.fderivWithin hs In) (hg.of_le (Nat.cast_le.2 (Nat.le_succ n))) _ ≤ ‖B‖ * ∑ i ∈ Finset.range (n + 1), n.choose i * ‖iteratedFDerivWithin 𝕜 i (fderivWithin 𝕜 f s) s x‖ * ‖iteratedFDerivWithin 𝕜 (n - i) g s x‖ := mul_le_mul_of_nonneg_right (B.norm_precompL_le Du) (by positivity) _ = _ := by congr 1 apply Finset.sum_congr rfl fun i _ => ?_ rw [← norm_iteratedFDerivWithin_fderivWithin hs hx] have J : iteratedFDerivWithin 𝕜 n (fun y : Du => fderivWithin 𝕜 (fun y : Du => B (f y) (g y)) s y) s x = iteratedFDerivWithin 𝕜 n (fun y => B.precompR Du (f y) (fderivWithin 𝕜 g s y) + B.precompL Du (fderivWithin 𝕜 f s y) (g y)) s x := by apply iteratedFDerivWithin_congr (fun y hy => ?_) hx have L : (1 : ℕ∞) ≤ n.succ := by simpa only [ENat.coe_one, Nat.one_le_cast] using Nat.succ_pos n exact B.fderivWithin_of_bilinear (hf.differentiableOn L y hy) (hg.differentiableOn L y hy) (hs y hy) rw [← norm_iteratedFDerivWithin_fderivWithin hs hx, J] have A : ContDiffOn 𝕜 n (fun y => B.precompR Du (f y) (fderivWithin 𝕜 g s y)) s := (B.precompR Du).isBoundedBilinearMap.contDiff.comp_contDiff_on₂ (hf.of_le (Nat.cast_le.2 (Nat.le_succ n))) (hg.fderivWithin hs In) have A' : ContDiffOn 𝕜 n (fun y => B.precompL Du (fderivWithin 𝕜 f s y) (g y)) s := (B.precompL Du).isBoundedBilinearMap.contDiff.comp_contDiff_on₂ (hf.fderivWithin hs In) (hg.of_le (Nat.cast_le.2 (Nat.le_succ n))) rw [iteratedFDerivWithin_add_apply' A A' hs hx] apply (norm_add_le _ _).trans ((add_le_add I1 I2).trans (le_of_eq ?_)) simp_rw [← mul_add, mul_assoc] congr 1 exact (Finset.sum_choose_succ_mul (fun i j => ‖iteratedFDerivWithin 𝕜 i f s x‖ * ‖iteratedFDerivWithin 𝕜 j g s x‖) n).symm #align continuous_linear_map.norm_iterated_fderiv_within_le_of_bilinear_aux ContinuousLinearMap.norm_iteratedFDerivWithin_le_of_bilinear_aux theorem ContinuousLinearMap.norm_iteratedFDerivWithin_le_of_bilinear (B : E →L[𝕜] F →L[𝕜] G) {f : D → E} {g : D → F} {N : ℕ∞} {s : Set D} {x : D} (hf : ContDiffOn 𝕜 N f s) (hg : ContDiffOn 𝕜 N g s) (hs : UniqueDiffOn 𝕜 s) (hx : x ∈ s) {n : ℕ} (hn : (n : ℕ∞) ≤ N) : ‖iteratedFDerivWithin 𝕜 n (fun y => B (f y) (g y)) s x‖ ≤ ‖B‖ * ∑ i ∈ Finset.range (n + 1), (n.choose i : ℝ) * ‖iteratedFDerivWithin 𝕜 i f s x‖ * ‖iteratedFDerivWithin 𝕜 (n - i) g s x‖ := by let Du : Type max uD uE uF uG := ULift.{max uE uF uG, uD} D let Eu : Type max uD uE uF uG := ULift.{max uD uF uG, uE} E let Fu : Type max uD uE uF uG := ULift.{max uD uE uG, uF} F let Gu : Type max uD uE uF uG := ULift.{max uD uE uF, uG} G have isoD : Du ≃ₗᵢ[𝕜] D := LinearIsometryEquiv.ulift 𝕜 D have isoE : Eu ≃ₗᵢ[𝕜] E := LinearIsometryEquiv.ulift 𝕜 E have isoF : Fu ≃ₗᵢ[𝕜] F := LinearIsometryEquiv.ulift 𝕜 F have isoG : Gu ≃ₗᵢ[𝕜] G := LinearIsometryEquiv.ulift 𝕜 G -- lift `f` and `g` to versions `fu` and `gu` on the lifted spaces. set fu : Du → Eu := isoE.symm ∘ f ∘ isoD with hfu set gu : Du → Fu := isoF.symm ∘ g ∘ isoD with hgu -- lift the bilinear map `B` to a bilinear map `Bu` on the lifted spaces. set Bu₀ : Eu →L[𝕜] Fu →L[𝕜] G := ((B.comp (isoE : Eu →L[𝕜] E)).flip.comp (isoF : Fu →L[𝕜] F)).flip with hBu₀ let Bu : Eu →L[𝕜] Fu →L[𝕜] Gu := ContinuousLinearMap.compL 𝕜 Eu (Fu →L[𝕜] G) (Fu →L[𝕜] Gu) (ContinuousLinearMap.compL 𝕜 Fu G Gu (isoG.symm : G →L[𝕜] Gu)) Bu₀ have hBu : Bu = ContinuousLinearMap.compL 𝕜 Eu (Fu →L[𝕜] G) (Fu →L[𝕜] Gu) (ContinuousLinearMap.compL 𝕜 Fu G Gu (isoG.symm : G →L[𝕜] Gu)) Bu₀ := rfl have Bu_eq : (fun y => Bu (fu y) (gu y)) = isoG.symm ∘ (fun y => B (f y) (g y)) ∘ isoD := by ext1 y simp [hBu, hBu₀, hfu, hgu] -- All norms are preserved by the lifting process. have Bu_le : ‖Bu‖ ≤ ‖B‖ := by refine' ContinuousLinearMap.opNorm_le_bound _ (norm_nonneg B) fun y => _ refine' ContinuousLinearMap.opNorm_le_bound _ (by positivity) fun x => _ simp only [hBu, hBu₀, compL_apply, coe_comp', Function.comp_apply, ContinuousLinearEquiv.coe_coe, LinearIsometryEquiv.coe_coe, flip_apply, LinearIsometryEquiv.norm_map] calc ‖B (isoE y) (isoF x)‖ ≤ ‖B (isoE y)‖ * ‖isoF x‖ := ContinuousLinearMap.le_opNorm _ _ _ ≤ ‖B‖ * ‖isoE y‖ * ‖isoF x‖ := by gcongr; apply ContinuousLinearMap.le_opNorm _ = ‖B‖ * ‖y‖ * ‖x‖ := by simp only [LinearIsometryEquiv.norm_map] let su := isoD ⁻¹' s have hsu : UniqueDiffOn 𝕜 su := isoD.toContinuousLinearEquiv.uniqueDiffOn_preimage_iff.2 hs let xu := isoD.symm x have hxu : xu ∈ su := by simpa only [xu, su, Set.mem_preimage, LinearIsometryEquiv.apply_symm_apply] using hx have xu_x : isoD xu = x := by simp only [xu, LinearIsometryEquiv.apply_symm_apply] have hfu : ContDiffOn 𝕜 n fu su := isoE.symm.contDiff.comp_contDiffOn ((hf.of_le hn).comp_continuousLinearMap (isoD : Du →L[𝕜] D)) have hgu : ContDiffOn 𝕜 n gu su := isoF.symm.contDiff.comp_contDiffOn ((hg.of_le hn).comp_continuousLinearMap (isoD : Du →L[𝕜] D)) have Nfu : ∀ i, ‖iteratedFDerivWithin 𝕜 i fu su xu‖ = ‖iteratedFDerivWithin 𝕜 i f s x‖ := by intro i rw [LinearIsometryEquiv.norm_iteratedFDerivWithin_comp_left _ _ hsu hxu] rw [LinearIsometryEquiv.norm_iteratedFDerivWithin_comp_right _ _ hs, xu_x] rwa [← xu_x] at hx have Ngu : ∀ i, ‖iteratedFDerivWithin 𝕜 i gu su xu‖ = ‖iteratedFDerivWithin 𝕜 i g s x‖ := by intro i rw [LinearIsometryEquiv.norm_iteratedFDerivWithin_comp_left _ _ hsu hxu] rw [LinearIsometryEquiv.norm_iteratedFDerivWithin_comp_right _ _ hs, xu_x] rwa [← xu_x] at hx have NBu : ‖iteratedFDerivWithin 𝕜 n (fun y => Bu (fu y) (gu y)) su xu‖ = ‖iteratedFDerivWithin 𝕜 n (fun y => B (f y) (g y)) s x‖ := by rw [Bu_eq] rw [LinearIsometryEquiv.norm_iteratedFDerivWithin_comp_left _ _ hsu hxu] rw [LinearIsometryEquiv.norm_iteratedFDerivWithin_comp_right _ _ hs, xu_x] rwa [← xu_x] at hx -- state the bound for the lifted objects, and deduce the original bound from it. have : ‖iteratedFDerivWithin 𝕜 n (fun y => Bu (fu y) (gu y)) su xu‖ ≤ ‖Bu‖ * ∑ i ∈ Finset.range (n + 1), (n.choose i : ℝ) * ‖iteratedFDerivWithin 𝕜 i fu su xu‖ * ‖iteratedFDerivWithin 𝕜 (n - i) gu su xu‖ := Bu.norm_iteratedFDerivWithin_le_of_bilinear_aux hfu hgu hsu hxu simp only [Nfu, Ngu, NBu] at this exact this.trans (mul_le_mul_of_nonneg_right Bu_le (by positivity)) #align continuous_linear_map.norm_iterated_fderiv_within_le_of_bilinear ContinuousLinearMap.norm_iteratedFDerivWithin_le_of_bilinear	Mathlib/Analysis/Calculus/ContDiff/Bounds.lean	211	218	theorem ContinuousLinearMap.norm_iteratedFDeriv_le_of_bilinear (B : E →L[𝕜] F →L[𝕜] G) {f : D → E} {g : D → F} {N : ℕ∞} (hf : ContDiff 𝕜 N f) (hg : ContDiff 𝕜 N g) (x : D) {n : ℕ} (hn : (n : ℕ∞) ≤ N) : ‖iteratedFDeriv 𝕜 n (fun y => B (f y) (g y)) x‖ ≤ ‖B‖ * ∑ i ∈ Finset.range (n + 1), (n.choose i : ℝ) * ‖iteratedFDeriv 𝕜 i f x‖ * ‖iteratedFDeriv 𝕜 (n - i) g x‖ := by	simp_rw [← iteratedFDerivWithin_univ] exact B.norm_iteratedFDerivWithin_le_of_bilinear hf.contDiffOn hg.contDiffOn uniqueDiffOn_univ (mem_univ x) hn
import Mathlib.Order.Interval.Set.Image import Mathlib.Order.CompleteLatticeIntervals import Mathlib.Topology.Order.DenselyOrdered import Mathlib.Topology.Order.Monotone #align_import topology.algebra.order.intermediate_value from "leanprover-community/mathlib"@"4c19a16e4b705bf135cf9a80ac18fcc99c438514" open Filter OrderDual TopologicalSpace Function Set open Topology Filter universe u v w section variable {X : Type u} {α : Type v} [TopologicalSpace X] [LinearOrder α] [TopologicalSpace α] [OrderClosedTopology α] theorem intermediate_value_univ₂ [PreconnectedSpace X] {a b : X} {f g : X → α} (hf : Continuous f) (hg : Continuous g) (ha : f a ≤ g a) (hb : g b ≤ f b) : ∃ x, f x = g x := by obtain ⟨x, _, hfg, hgf⟩ : (univ ∩ { x \| f x ≤ g x ∧ g x ≤ f x }).Nonempty := isPreconnected_closed_iff.1 PreconnectedSpace.isPreconnected_univ _ _ (isClosed_le hf hg) (isClosed_le hg hf) (fun _ _ => le_total _ _) ⟨a, trivial, ha⟩ ⟨b, trivial, hb⟩ exact ⟨x, le_antisymm hfg hgf⟩ #align intermediate_value_univ₂ intermediate_value_univ₂ theorem intermediate_value_univ₂_eventually₁ [PreconnectedSpace X] {a : X} {l : Filter X} [NeBot l] {f g : X → α} (hf : Continuous f) (hg : Continuous g) (ha : f a ≤ g a) (he : g ≤ᶠ[l] f) : ∃ x, f x = g x := let ⟨_, h⟩ := he.exists; intermediate_value_univ₂ hf hg ha h #align intermediate_value_univ₂_eventually₁ intermediate_value_univ₂_eventually₁ theorem intermediate_value_univ₂_eventually₂ [PreconnectedSpace X] {l₁ l₂ : Filter X} [NeBot l₁] [NeBot l₂] {f g : X → α} (hf : Continuous f) (hg : Continuous g) (he₁ : f ≤ᶠ[l₁] g) (he₂ : g ≤ᶠ[l₂] f) : ∃ x, f x = g x := let ⟨_, h₁⟩ := he₁.exists let ⟨_, h₂⟩ := he₂.exists intermediate_value_univ₂ hf hg h₁ h₂ #align intermediate_value_univ₂_eventually₂ intermediate_value_univ₂_eventually₂ theorem IsPreconnected.intermediate_value₂ {s : Set X} (hs : IsPreconnected s) {a b : X} (ha : a ∈ s) (hb : b ∈ s) {f g : X → α} (hf : ContinuousOn f s) (hg : ContinuousOn g s) (ha' : f a ≤ g a) (hb' : g b ≤ f b) : ∃ x ∈ s, f x = g x := let ⟨x, hx⟩ := @intermediate_value_univ₂ s α _ _ _ _ (Subtype.preconnectedSpace hs) ⟨a, ha⟩ ⟨b, hb⟩ _ _ (continuousOn_iff_continuous_restrict.1 hf) (continuousOn_iff_continuous_restrict.1 hg) ha' hb' ⟨x, x.2, hx⟩ #align is_preconnected.intermediate_value₂ IsPreconnected.intermediate_value₂ theorem IsPreconnected.intermediate_value₂_eventually₁ {s : Set X} (hs : IsPreconnected s) {a : X} {l : Filter X} (ha : a ∈ s) [NeBot l] (hl : l ≤ 𝓟 s) {f g : X → α} (hf : ContinuousOn f s) (hg : ContinuousOn g s) (ha' : f a ≤ g a) (he : g ≤ᶠ[l] f) : ∃ x ∈ s, f x = g x := by rw [continuousOn_iff_continuous_restrict] at hf hg obtain ⟨b, h⟩ := @intermediate_value_univ₂_eventually₁ _ _ _ _ _ _ (Subtype.preconnectedSpace hs) ⟨a, ha⟩ _ (comap_coe_neBot_of_le_principal hl) _ _ hf hg ha' (he.comap _) exact ⟨b, b.prop, h⟩ #align is_preconnected.intermediate_value₂_eventually₁ IsPreconnected.intermediate_value₂_eventually₁ theorem IsPreconnected.intermediate_value₂_eventually₂ {s : Set X} (hs : IsPreconnected s) {l₁ l₂ : Filter X} [NeBot l₁] [NeBot l₂] (hl₁ : l₁ ≤ 𝓟 s) (hl₂ : l₂ ≤ 𝓟 s) {f g : X → α} (hf : ContinuousOn f s) (hg : ContinuousOn g s) (he₁ : f ≤ᶠ[l₁] g) (he₂ : g ≤ᶠ[l₂] f) : ∃ x ∈ s, f x = g x := by rw [continuousOn_iff_continuous_restrict] at hf hg obtain ⟨b, h⟩ := @intermediate_value_univ₂_eventually₂ _ _ _ _ _ _ (Subtype.preconnectedSpace hs) _ _ (comap_coe_neBot_of_le_principal hl₁) (comap_coe_neBot_of_le_principal hl₂) _ _ hf hg (he₁.comap _) (he₂.comap _) exact ⟨b, b.prop, h⟩ #align is_preconnected.intermediate_value₂_eventually₂ IsPreconnected.intermediate_value₂_eventually₂ theorem IsPreconnected.intermediate_value {s : Set X} (hs : IsPreconnected s) {a b : X} (ha : a ∈ s) (hb : b ∈ s) {f : X → α} (hf : ContinuousOn f s) : Icc (f a) (f b) ⊆ f '' s := fun _x hx => hs.intermediate_value₂ ha hb hf continuousOn_const hx.1 hx.2 #align is_preconnected.intermediate_value IsPreconnected.intermediate_value theorem IsPreconnected.intermediate_value_Ico {s : Set X} (hs : IsPreconnected s) {a : X} {l : Filter X} (ha : a ∈ s) [NeBot l] (hl : l ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) {v : α} (ht : Tendsto f l (𝓝 v)) : Ico (f a) v ⊆ f '' s := fun _ h => hs.intermediate_value₂_eventually₁ ha hl hf continuousOn_const h.1 (eventually_ge_of_tendsto_gt h.2 ht) #align is_preconnected.intermediate_value_Ico IsPreconnected.intermediate_value_Ico theorem IsPreconnected.intermediate_value_Ioc {s : Set X} (hs : IsPreconnected s) {a : X} {l : Filter X} (ha : a ∈ s) [NeBot l] (hl : l ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) {v : α} (ht : Tendsto f l (𝓝 v)) : Ioc v (f a) ⊆ f '' s := fun _ h => (hs.intermediate_value₂_eventually₁ ha hl continuousOn_const hf h.2 (eventually_le_of_tendsto_lt h.1 ht)).imp fun _ h => h.imp_right Eq.symm #align is_preconnected.intermediate_value_Ioc IsPreconnected.intermediate_value_Ioc theorem IsPreconnected.intermediate_value_Ioo {s : Set X} (hs : IsPreconnected s) {l₁ l₂ : Filter X} [NeBot l₁] [NeBot l₂] (hl₁ : l₁ ≤ 𝓟 s) (hl₂ : l₂ ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) {v₁ v₂ : α} (ht₁ : Tendsto f l₁ (𝓝 v₁)) (ht₂ : Tendsto f l₂ (𝓝 v₂)) : Ioo v₁ v₂ ⊆ f '' s := fun _ h => hs.intermediate_value₂_eventually₂ hl₁ hl₂ hf continuousOn_const (eventually_le_of_tendsto_lt h.1 ht₁) (eventually_ge_of_tendsto_gt h.2 ht₂) #align is_preconnected.intermediate_value_Ioo IsPreconnected.intermediate_value_Ioo theorem IsPreconnected.intermediate_value_Ici {s : Set X} (hs : IsPreconnected s) {a : X} {l : Filter X} (ha : a ∈ s) [NeBot l] (hl : l ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) (ht : Tendsto f l atTop) : Ici (f a) ⊆ f '' s := fun y h => hs.intermediate_value₂_eventually₁ ha hl hf continuousOn_const h (tendsto_atTop.1 ht y) #align is_preconnected.intermediate_value_Ici IsPreconnected.intermediate_value_Ici theorem IsPreconnected.intermediate_value_Iic {s : Set X} (hs : IsPreconnected s) {a : X} {l : Filter X} (ha : a ∈ s) [NeBot l] (hl : l ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) (ht : Tendsto f l atBot) : Iic (f a) ⊆ f '' s := fun y h => (hs.intermediate_value₂_eventually₁ ha hl continuousOn_const hf h (tendsto_atBot.1 ht y)).imp fun _ h => h.imp_right Eq.symm #align is_preconnected.intermediate_value_Iic IsPreconnected.intermediate_value_Iic theorem IsPreconnected.intermediate_value_Ioi {s : Set X} (hs : IsPreconnected s) {l₁ l₂ : Filter X} [NeBot l₁] [NeBot l₂] (hl₁ : l₁ ≤ 𝓟 s) (hl₂ : l₂ ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) {v : α} (ht₁ : Tendsto f l₁ (𝓝 v)) (ht₂ : Tendsto f l₂ atTop) : Ioi v ⊆ f '' s := fun y h => hs.intermediate_value₂_eventually₂ hl₁ hl₂ hf continuousOn_const (eventually_le_of_tendsto_lt h ht₁) (tendsto_atTop.1 ht₂ y) #align is_preconnected.intermediate_value_Ioi IsPreconnected.intermediate_value_Ioi theorem IsPreconnected.intermediate_value_Iio {s : Set X} (hs : IsPreconnected s) {l₁ l₂ : Filter X} [NeBot l₁] [NeBot l₂] (hl₁ : l₁ ≤ 𝓟 s) (hl₂ : l₂ ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) {v : α} (ht₁ : Tendsto f l₁ atBot) (ht₂ : Tendsto f l₂ (𝓝 v)) : Iio v ⊆ f '' s := fun y h => hs.intermediate_value₂_eventually₂ hl₁ hl₂ hf continuousOn_const (tendsto_atBot.1 ht₁ y) (eventually_ge_of_tendsto_gt h ht₂) #align is_preconnected.intermediate_value_Iio IsPreconnected.intermediate_value_Iio theorem IsPreconnected.intermediate_value_Iii {s : Set X} (hs : IsPreconnected s) {l₁ l₂ : Filter X} [NeBot l₁] [NeBot l₂] (hl₁ : l₁ ≤ 𝓟 s) (hl₂ : l₂ ≤ 𝓟 s) {f : X → α} (hf : ContinuousOn f s) (ht₁ : Tendsto f l₁ atBot) (ht₂ : Tendsto f l₂ atTop) : univ ⊆ f '' s := fun y _ => hs.intermediate_value₂_eventually₂ hl₁ hl₂ hf continuousOn_const (tendsto_atBot.1 ht₁ y) (tendsto_atTop.1 ht₂ y) set_option linter.uppercaseLean3 false in #align is_preconnected.intermediate_value_Iii IsPreconnected.intermediate_value_Iii theorem intermediate_value_univ [PreconnectedSpace X] (a b : X) {f : X → α} (hf : Continuous f) : Icc (f a) (f b) ⊆ range f := fun _ hx => intermediate_value_univ₂ hf continuous_const hx.1 hx.2 #align intermediate_value_univ intermediate_value_univ theorem mem_range_of_exists_le_of_exists_ge [PreconnectedSpace X] {c : α} {f : X → α} (hf : Continuous f) (h₁ : ∃ a, f a ≤ c) (h₂ : ∃ b, c ≤ f b) : c ∈ range f := let ⟨a, ha⟩ := h₁; let ⟨b, hb⟩ := h₂; intermediate_value_univ a b hf ⟨ha, hb⟩ #align mem_range_of_exists_le_of_exists_ge mem_range_of_exists_le_of_exists_ge theorem IsPreconnected.Icc_subset {s : Set α} (hs : IsPreconnected s) {a b : α} (ha : a ∈ s) (hb : b ∈ s) : Icc a b ⊆ s := by simpa only [image_id] using hs.intermediate_value ha hb continuousOn_id #align is_preconnected.Icc_subset IsPreconnected.Icc_subset theorem IsPreconnected.ordConnected {s : Set α} (h : IsPreconnected s) : OrdConnected s := ⟨fun _ hx _ hy => h.Icc_subset hx hy⟩ #align is_preconnected.ord_connected IsPreconnected.ordConnected theorem IsConnected.Icc_subset {s : Set α} (hs : IsConnected s) {a b : α} (ha : a ∈ s) (hb : b ∈ s) : Icc a b ⊆ s := hs.2.Icc_subset ha hb #align is_connected.Icc_subset IsConnected.Icc_subset theorem IsPreconnected.eq_univ_of_unbounded {s : Set α} (hs : IsPreconnected s) (hb : ¬BddBelow s) (ha : ¬BddAbove s) : s = univ := by refine eq_univ_of_forall fun x => ?_ obtain ⟨y, ys, hy⟩ : ∃ y ∈ s, y < x := not_bddBelow_iff.1 hb x obtain ⟨z, zs, hz⟩ : ∃ z ∈ s, x < z := not_bddAbove_iff.1 ha x exact hs.Icc_subset ys zs ⟨le_of_lt hy, le_of_lt hz⟩ #align is_preconnected.eq_univ_of_unbounded IsPreconnected.eq_univ_of_unbounded end variable {α : Type u} {β : Type v} {γ : Type w} [ConditionallyCompleteLinearOrder α] [TopologicalSpace α] [OrderTopology α] [ConditionallyCompleteLinearOrder β] [TopologicalSpace β] [OrderTopology β] [Nonempty γ] theorem IsConnected.Ioo_csInf_csSup_subset {s : Set α} (hs : IsConnected s) (hb : BddBelow s) (ha : BddAbove s) : Ioo (sInf s) (sSup s) ⊆ s := fun _x hx => let ⟨_y, ys, hy⟩ := (isGLB_lt_iff (isGLB_csInf hs.nonempty hb)).1 hx.1 let ⟨_z, zs, hz⟩ := (lt_isLUB_iff (isLUB_csSup hs.nonempty ha)).1 hx.2 hs.Icc_subset ys zs ⟨hy.le, hz.le⟩ #align is_connected.Ioo_cInf_cSup_subset IsConnected.Ioo_csInf_csSup_subset theorem eq_Icc_csInf_csSup_of_connected_bdd_closed {s : Set α} (hc : IsConnected s) (hb : BddBelow s) (ha : BddAbove s) (hcl : IsClosed s) : s = Icc (sInf s) (sSup s) := (subset_Icc_csInf_csSup hb ha).antisymm <\| hc.Icc_subset (hcl.csInf_mem hc.nonempty hb) (hcl.csSup_mem hc.nonempty ha) #align eq_Icc_cInf_cSup_of_connected_bdd_closed eq_Icc_csInf_csSup_of_connected_bdd_closed theorem IsPreconnected.Ioi_csInf_subset {s : Set α} (hs : IsPreconnected s) (hb : BddBelow s) (ha : ¬BddAbove s) : Ioi (sInf s) ⊆ s := fun x hx => have sne : s.Nonempty := nonempty_of_not_bddAbove ha let ⟨_y, ys, hy⟩ : ∃ y ∈ s, y < x := (isGLB_lt_iff (isGLB_csInf sne hb)).1 hx let ⟨_z, zs, hz⟩ : ∃ z ∈ s, x < z := not_bddAbove_iff.1 ha x hs.Icc_subset ys zs ⟨hy.le, hz.le⟩ #align is_preconnected.Ioi_cInf_subset IsPreconnected.Ioi_csInf_subset theorem IsPreconnected.Iio_csSup_subset {s : Set α} (hs : IsPreconnected s) (hb : ¬BddBelow s) (ha : BddAbove s) : Iio (sSup s) ⊆ s := IsPreconnected.Ioi_csInf_subset (α := αᵒᵈ) hs ha hb #align is_preconnected.Iio_cSup_subset IsPreconnected.Iio_csSup_subset theorem IsPreconnected.mem_intervals {s : Set α} (hs : IsPreconnected s) : s ∈ ({Icc (sInf s) (sSup s), Ico (sInf s) (sSup s), Ioc (sInf s) (sSup s), Ioo (sInf s) (sSup s), Ici (sInf s), Ioi (sInf s), Iic (sSup s), Iio (sSup s), univ, ∅} : Set (Set α)) := by rcases s.eq_empty_or_nonempty with (rfl \| hne) · apply_rules [Or.inr, mem_singleton] have hs' : IsConnected s := ⟨hne, hs⟩ by_cases hb : BddBelow s <;> by_cases ha : BddAbove s · refine mem_of_subset_of_mem ?_ <\| mem_Icc_Ico_Ioc_Ioo_of_subset_of_subset (hs'.Ioo_csInf_csSup_subset hb ha) (subset_Icc_csInf_csSup hb ha) simp only [insert_subset_iff, mem_insert_iff, mem_singleton_iff, true_or, or_true, singleton_subset_iff, and_self] · refine Or.inr <\| Or.inr <\| Or.inr <\| Or.inr ?_ cases' mem_Ici_Ioi_of_subset_of_subset (hs.Ioi_csInf_subset hb ha) fun x hx => csInf_le hb hx with hs hs · exact Or.inl hs · exact Or.inr (Or.inl hs) · iterate 6 apply Or.inr cases' mem_Iic_Iio_of_subset_of_subset (hs.Iio_csSup_subset hb ha) fun x hx => le_csSup ha hx with hs hs · exact Or.inl hs · exact Or.inr (Or.inl hs) · iterate 8 apply Or.inr exact Or.inl (hs.eq_univ_of_unbounded hb ha) #align is_preconnected.mem_intervals IsPreconnected.mem_intervals theorem setOf_isPreconnected_subset_of_ordered : { s : Set α \| IsPreconnected s } ⊆ -- bounded intervals (range (uncurry Icc) ∪ range (uncurry Ico) ∪ range (uncurry Ioc) ∪ range (uncurry Ioo)) ∪ -- unbounded intervals and `univ` (range Ici ∪ range Ioi ∪ range Iic ∪ range Iio ∪ {univ, ∅}) := by intro s hs rcases hs.mem_intervals with (hs \| hs \| hs \| hs \| hs \| hs \| hs \| hs \| hs \| hs) <;> rw [hs] <;> simp only [union_insert, union_singleton, mem_insert_iff, mem_union, mem_range, Prod.exists, uncurry_apply_pair, exists_apply_eq_apply, true_or, or_true, exists_apply_eq_apply2] #align set_of_is_preconnected_subset_of_ordered setOf_isPreconnected_subset_of_ordered theorem IsClosed.mem_of_ge_of_forall_exists_gt {a b : α} {s : Set α} (hs : IsClosed (s ∩ Icc a b)) (ha : a ∈ s) (hab : a ≤ b) (hgt : ∀ x ∈ s ∩ Ico a b, (s ∩ Ioc x b).Nonempty) : b ∈ s := by let S := s ∩ Icc a b replace ha : a ∈ S := ⟨ha, left_mem_Icc.2 hab⟩ have Sbd : BddAbove S := ⟨b, fun z hz => hz.2.2⟩ let c := sSup (s ∩ Icc a b) have c_mem : c ∈ S := hs.csSup_mem ⟨_, ha⟩ Sbd have c_le : c ≤ b := csSup_le ⟨_, ha⟩ fun x hx => hx.2.2 cases' eq_or_lt_of_le c_le with hc hc · exact hc ▸ c_mem.1 exfalso rcases hgt c ⟨c_mem.1, c_mem.2.1, hc⟩ with ⟨x, xs, cx, xb⟩ exact not_lt_of_le (le_csSup Sbd ⟨xs, le_trans (le_csSup Sbd ha) (le_of_lt cx), xb⟩) cx #align is_closed.mem_of_ge_of_forall_exists_gt IsClosed.mem_of_ge_of_forall_exists_gt theorem IsClosed.Icc_subset_of_forall_exists_gt {a b : α} {s : Set α} (hs : IsClosed (s ∩ Icc a b)) (ha : a ∈ s) (hgt : ∀ x ∈ s ∩ Ico a b, ∀ y ∈ Ioi x, (s ∩ Ioc x y).Nonempty) : Icc a b ⊆ s := by intro y hy have : IsClosed (s ∩ Icc a y) := by suffices s ∩ Icc a y = s ∩ Icc a b ∩ Icc a y by rw [this] exact IsClosed.inter hs isClosed_Icc rw [inter_assoc] congr exact (inter_eq_self_of_subset_right <\| Icc_subset_Icc_right hy.2).symm exact IsClosed.mem_of_ge_of_forall_exists_gt this ha hy.1 fun x hx => hgt x ⟨hx.1, Ico_subset_Ico_right hy.2 hx.2⟩ y hx.2.2 #align is_closed.Icc_subset_of_forall_exists_gt IsClosed.Icc_subset_of_forall_exists_gt variable [DenselyOrdered α] {a b : α}	Mathlib/Topology/Order/IntermediateValue.lean	372	379	theorem IsClosed.Icc_subset_of_forall_mem_nhdsWithin {a b : α} {s : Set α} (hs : IsClosed (s ∩ Icc a b)) (ha : a ∈ s) (hgt : ∀ x ∈ s ∩ Ico a b, s ∈ 𝓝[>] x) : Icc a b ⊆ s := by	apply hs.Icc_subset_of_forall_exists_gt ha rintro x ⟨hxs, hxab⟩ y hyxb have : s ∩ Ioc x y ∈ 𝓝[>] x := inter_mem (hgt x ⟨hxs, hxab⟩) (Ioc_mem_nhdsWithin_Ioi ⟨le_rfl, hyxb⟩) exact (nhdsWithin_Ioi_self_neBot' ⟨b, hxab.2⟩).nonempty_of_mem this
import Mathlib.Data.Real.Pi.Bounds import Mathlib.NumberTheory.NumberField.CanonicalEmbedding.ConvexBody -- TODO. Rewrite some of the FLT results on the disciminant using the definitions and results of -- this file namespace NumberField open FiniteDimensional NumberField NumberField.InfinitePlace Matrix open scoped Classical Real nonZeroDivisors variable (K : Type) [Field K] [NumberField K] noncomputable abbrev discr : ℤ := Algebra.discr ℤ (RingOfIntegers.basis K) theorem coe_discr : (discr K : ℚ) = Algebra.discr ℚ (integralBasis K) := (Algebra.discr_localizationLocalization ℤ _ K (RingOfIntegers.basis K)).symm theorem discr_ne_zero : discr K ≠ 0 := by rw [← (Int.cast_injective (α := ℚ)).ne_iff, coe_discr] exact Algebra.discr_not_zero_of_basis ℚ (integralBasis K) theorem discr_eq_discr {ι : Type} [Fintype ι] [DecidableEq ι] (b : Basis ι ℤ (𝓞 K)) : Algebra.discr ℤ b = discr K := by let b₀ := Basis.reindex (RingOfIntegers.basis K) (Basis.indexEquiv (RingOfIntegers.basis K) b) rw [Algebra.discr_eq_discr (𝓞 K) b b₀, Basis.coe_reindex, Algebra.discr_reindex] theorem discr_eq_discr_of_algEquiv {L : Type} [Field L] [NumberField L] (f : K ≃ₐ[ℚ] L) : discr K = discr L := by let f₀ : 𝓞 K ≃ₗ[ℤ] 𝓞 L := (f.restrictScalars ℤ).mapIntegralClosure.toLinearEquiv rw [← Rat.intCast_inj, coe_discr, Algebra.discr_eq_discr_of_algEquiv (integralBasis K) f, ← discr_eq_discr L ((RingOfIntegers.basis K).map f₀)] change _ = algebraMap ℤ ℚ _ rw [← Algebra.discr_localizationLocalization ℤ (nonZeroDivisors ℤ) L] congr ext simp only [Function.comp_apply, integralBasis_apply, Basis.localizationLocalization_apply, Basis.map_apply] rfl open MeasureTheory MeasureTheory.Measure Zspan NumberField.mixedEmbedding NumberField.InfinitePlace ENNReal NNReal Complex theorem _root_.NumberField.mixedEmbedding.volume_fundamentalDomain_latticeBasis : volume (fundamentalDomain (latticeBasis K)) = (2 : ℝ≥0∞)⁻¹ ^ NrComplexPlaces K sqrt ‖discr K‖₊ := by let f : Module.Free.ChooseBasisIndex ℤ (𝓞 K) ≃ (K →+* ℂ) := (canonicalEmbedding.latticeBasis K).indexEquiv (Pi.basisFun ℂ _) let e : (index K) ≃ Module.Free.ChooseBasisIndex ℤ (𝓞 K) := (indexEquiv K).trans f.symm let M := (mixedEmbedding.stdBasis K).toMatrix ((latticeBasis K).reindex e.symm) let N := Algebra.embeddingsMatrixReindex ℚ ℂ (integralBasis K ∘ f.symm) RingHom.equivRatAlgHom suffices M.map Complex.ofReal = (matrixToStdBasis K) * (Matrix.reindex (indexEquiv K).symm (indexEquiv K).symm N).transpose by calc volume (fundamentalDomain (latticeBasis K)) _ = ‖((mixedEmbedding.stdBasis K).toMatrix ((latticeBasis K).reindex e.symm)).det‖₊ := by rw [← fundamentalDomain_reindex _ e.symm, ← norm_toNNReal, measure_fundamentalDomain ((latticeBasis K).reindex e.symm), volume_fundamentalDomain_stdBasis, mul_one] rfl _ = ‖(matrixToStdBasis K).det * N.det‖₊ := by rw [← nnnorm_real, ← ofReal_eq_coe, RingHom.map_det, RingHom.mapMatrix_apply, this, det_mul, det_transpose, det_reindex_self] _ = (2 : ℝ≥0∞)⁻¹ ^ Fintype.card {w : InfinitePlace K // IsComplex w} * sqrt ‖N.det ^ 2‖₊ := by have : ‖Complex.I‖₊ = 1 := by rw [← norm_toNNReal, norm_eq_abs, abs_I, Real.toNNReal_one] rw [det_matrixToStdBasis, nnnorm_mul, nnnorm_pow, nnnorm_mul, this, mul_one, nnnorm_inv, coe_mul, ENNReal.coe_pow, ← norm_toNNReal, RCLike.norm_two, Real.toNNReal_ofNat, coe_inv two_ne_zero, coe_ofNat, nnnorm_pow, NNReal.sqrt_sq] _ = (2 : ℝ≥0∞)⁻¹ ^ Fintype.card { w // IsComplex w } * NNReal.sqrt ‖discr K‖₊ := by rw [← Algebra.discr_eq_det_embeddingsMatrixReindex_pow_two, Algebra.discr_reindex, ← coe_discr, map_intCast, ← Complex.nnnorm_int] ext : 2 dsimp only [M] rw [Matrix.map_apply, Basis.toMatrix_apply, Basis.coe_reindex, Function.comp_apply, Equiv.symm_symm, latticeBasis_apply, ← commMap_canonical_eq_mixed, Complex.ofReal_eq_coe, stdBasis_repr_eq_matrixToStdBasis_mul K _ (fun _ => rfl)] rfl theorem exists_ne_zero_mem_ideal_of_norm_le_mul_sqrt_discr (I : (FractionalIdeal (𝓞 K)⁰ K)ˣ) : ∃ a ∈ (I : FractionalIdeal (𝓞 K)⁰ K), a ≠ 0 ∧ \|Algebra.norm ℚ (a:K)\| ≤ FractionalIdeal.absNorm I.1 * (4 / π) ^ NrComplexPlaces K * (finrank ℚ K).factorial / (finrank ℚ K) ^ (finrank ℚ K) * Real.sqrt \|discr K\| := by -- The smallest possible value for `exists_ne_zero_mem_ideal_of_norm_le` let B := (minkowskiBound K I * (convexBodySumFactor K)⁻¹).toReal ^ (1 / (finrank ℚ K : ℝ)) have h_le : (minkowskiBound K I) ≤ volume (convexBodySum K B) := by refine le_of_eq ?_ rw [convexBodySum_volume, ← ENNReal.ofReal_pow (by positivity), ← Real.rpow_natCast, ← Real.rpow_mul toReal_nonneg, div_mul_cancel₀, Real.rpow_one, ofReal_toReal, mul_comm, mul_assoc, ← coe_mul, inv_mul_cancel (convexBodySumFactor_ne_zero K), ENNReal.coe_one, mul_one] · exact mul_ne_top (ne_of_lt (minkowskiBound_lt_top K I)) coe_ne_top · exact (Nat.cast_ne_zero.mpr (ne_of_gt finrank_pos)) convert exists_ne_zero_mem_ideal_of_norm_le K I h_le rw [div_pow B, ← Real.rpow_natCast B, ← Real.rpow_mul (by positivity), div_mul_cancel₀ _ (Nat.cast_ne_zero.mpr <\| ne_of_gt finrank_pos), Real.rpow_one, mul_comm_div, mul_div_assoc'] congr 1 rw [eq_comm] calc _ = FractionalIdeal.absNorm I.1 * (2 : ℝ)⁻¹ ^ NrComplexPlaces K * sqrt ‖discr K‖₊ * (2 : ℝ) ^ finrank ℚ K * ((2 : ℝ) ^ NrRealPlaces K * (π / 2) ^ NrComplexPlaces K / (Nat.factorial (finrank ℚ K)))⁻¹ := by simp_rw [minkowskiBound, convexBodySumFactor, volume_fundamentalDomain_fractionalIdealLatticeBasis, volume_fundamentalDomain_latticeBasis, toReal_mul, toReal_pow, toReal_inv, coe_toReal, toReal_ofNat, mixedEmbedding.finrank, mul_assoc] rw [ENNReal.toReal_ofReal (Rat.cast_nonneg.mpr (FractionalIdeal.absNorm_nonneg I.1))] simp_rw [NNReal.coe_inv, NNReal.coe_div, NNReal.coe_mul, NNReal.coe_pow, NNReal.coe_div, coe_real_pi, NNReal.coe_ofNat, NNReal.coe_natCast] _ = FractionalIdeal.absNorm I.1 * (2 : ℝ) ^ (finrank ℚ K - NrComplexPlaces K - NrRealPlaces K + NrComplexPlaces K : ℤ) * Real.sqrt ‖discr K‖ * Nat.factorial (finrank ℚ K) * π⁻¹ ^ (NrComplexPlaces K) := by simp_rw [inv_div, div_eq_mul_inv, mul_inv, ← zpow_neg_one, ← zpow_natCast, mul_zpow, ← zpow_mul, neg_one_mul, mul_neg_one, neg_neg, Real.coe_sqrt, coe_nnnorm, sub_eq_add_neg, zpow_add₀ (two_ne_zero : (2 : ℝ) ≠ 0)] ring _ = FractionalIdeal.absNorm I.1 * (2 : ℝ) ^ (2 * NrComplexPlaces K : ℤ) * Real.sqrt ‖discr K‖ * Nat.factorial (finrank ℚ K) * π⁻¹ ^ (NrComplexPlaces K) := by congr rw [← card_add_two_mul_card_eq_rank, Nat.cast_add, Nat.cast_mul, Nat.cast_ofNat] ring _ = FractionalIdeal.absNorm I.1 * (4 / π) ^ NrComplexPlaces K * (finrank ℚ K).factorial * Real.sqrt \|discr K\| := by rw [Int.norm_eq_abs, zpow_mul, show (2 : ℝ) ^ (2 : ℤ) = 4 by norm_cast, div_pow, inv_eq_one_div, div_pow, one_pow, zpow_natCast] ring theorem exists_ne_zero_mem_ringOfIntegers_of_norm_le_mul_sqrt_discr : ∃ (a : 𝓞 K), a ≠ 0 ∧ \|Algebra.norm ℚ (a : K)\| ≤ (4 / π) ^ NrComplexPlaces K * (finrank ℚ K).factorial / (finrank ℚ K) ^ (finrank ℚ K) * Real.sqrt \|discr K\| := by obtain ⟨_, h_mem, h_nz, h_nm⟩ := exists_ne_zero_mem_ideal_of_norm_le_mul_sqrt_discr K ↑1 obtain ⟨a, rfl⟩ := (FractionalIdeal.mem_one_iff _).mp h_mem refine ⟨a, ne_zero_of_map h_nz, ?_⟩ simp_rw [Units.val_one, FractionalIdeal.absNorm_one, Rat.cast_one, one_mul] at h_nm exact h_nm variable {K} theorem abs_discr_ge (h : 1 < finrank ℚ K) : (4 / 9 : ℝ) * (3 * π / 4) ^ finrank ℚ K ≤ \|discr K\| := by -- We use `exists_ne_zero_mem_ringOfIntegers_of_norm_le_mul_sqrt_discr` to get a nonzero -- algebraic integer `x` of small norm and the fact that `1 ≤ \|Norm x\|` to get a lower bound -- on `sqrt \|discr K\|`. obtain ⟨x, h_nz, h_bd⟩ := exists_ne_zero_mem_ringOfIntegers_of_norm_le_mul_sqrt_discr K have h_nm : (1 : ℝ) ≤ \|Algebra.norm ℚ (x : K)\| := by rw [← Algebra.coe_norm_int, ← Int.cast_one, ← Int.cast_abs, Rat.cast_intCast, Int.cast_le] exact Int.one_le_abs (Algebra.norm_ne_zero_iff.mpr h_nz) replace h_bd := le_trans h_nm h_bd rw [← inv_mul_le_iff (by positivity), inv_div, mul_one, Real.le_sqrt (by positivity) (by positivity), ← Int.cast_abs, div_pow, mul_pow, ← pow_mul, ← pow_mul] at h_bd refine le_trans ?_ h_bd -- The sequence `a n` is a lower bound for `\|discr K\|`. We prove below by induction an uniform -- lower bound for this sequence from which we deduce the result. let a : ℕ → ℝ := fun n => (n : ℝ) ^ (n * 2) / ((4 / π) ^ n * (n.factorial : ℝ) ^ 2) suffices ∀ n, 2 ≤ n → (4 / 9 : ℝ) * (3 * π / 4) ^ n ≤ a n by refine le_trans (this (finrank ℚ K) h) ?_ simp only [a] gcongr · exact (one_le_div Real.pi_pos).2 Real.pi_le_four · rw [← card_add_two_mul_card_eq_rank, mul_comm] exact Nat.le_add_left _ _ intro n hn induction n, hn using Nat.le_induction with \| base => exact le_of_eq <\| by norm_num [a, Nat.factorial_two]; field_simp; ring \| succ m _ h_m => suffices (3 : ℝ) ≤ (1 + 1 / m : ℝ) ^ (2 * m) by convert_to _ ≤ (a m) * (1 + 1 / m : ℝ) ^ (2 * m) / (4 / π) · simp_rw [a, add_mul, one_mul, pow_succ, Nat.factorial_succ] field_simp; ring · rw [_root_.le_div_iff (by positivity), pow_succ] convert (mul_le_mul h_m this (by positivity) (by positivity)) using 1 field_simp; ring refine le_trans (le_of_eq (by field_simp; norm_num)) (one_add_mul_le_pow ?_ (2 * m)) exact le_trans (by norm_num : (-2 : ℝ) ≤ 0) (by positivity) theorem abs_discr_gt_two (h : 1 < finrank ℚ K) : 2 < \|discr K\| := by have h₁ : 1 ≤ 3 * π / 4 := by rw [_root_.le_div_iff (by positivity), ← _root_.div_le_iff' (by positivity), one_mul] linarith [Real.pi_gt_three] have h₂ : (9 : ℝ) < π ^ 2 := by rw [ ← Real.sqrt_lt (by positivity) (by positivity), show Real.sqrt (9 : ℝ) = 3 from (Real.sqrt_eq_iff_sq_eq (by positivity) (by positivity)).mpr (by norm_num)] exact Real.pi_gt_three refine Int.cast_lt.mp <\| lt_of_lt_of_le ?_ (abs_discr_ge h) rw [← _root_.div_lt_iff' (by positivity), Int.cast_ofNat] refine lt_of_lt_of_le ?_ (pow_le_pow_right (n := 2) h₁ h) rw [div_pow, _root_.lt_div_iff (by norm_num), mul_pow, show (2 : ℝ) / (4 / 9) * 4 ^ 2 = 72 by norm_num, show (3 : ℝ) ^ 2 = 9 by norm_num, ← _root_.div_lt_iff' (by positivity), show (72 : ℝ) / 9 = 8 by norm_num] linarith [h₂] namespace hermiteTheorem open Polynomial open scoped IntermediateField variable (A : Type) [Field A] [CharZero A] theorem finite_of_finite_generating_set {p : IntermediateField ℚ A → Prop} (S : Set {F : IntermediateField ℚ A // p F}) {T : Set A} (hT : T.Finite) (h : ∀ F ∈ S, ∃ x ∈ T, F = ℚ⟮x⟯) : S.Finite := by rw [← Set.finite_coe_iff] at hT refine Set.finite_coe_iff.mp <\| Finite.of_injective (fun ⟨F, hF⟩ ↦ (⟨(h F hF).choose, (h F hF).choose_spec.1⟩ : T)) (fun _ _ h_eq ↦ ?_) rw [Subtype.ext_iff_val, Subtype.ext_iff_val] convert congr_arg (ℚ⟮·⟯) (Subtype.mk_eq_mk.mp h_eq) all_goals exact (h _ (Subtype.mem _)).choose_spec.2 variable (N : ℕ) noncomputable abbrev rankOfDiscrBdd : ℕ := max 1 (Nat.floor ((Real.log ((9 / 4 : ℝ) N) / Real.log (3 * π / 4)))) noncomputable abbrev boundOfDiscBdd : ℝ≥0 := sqrt N * (2:ℝ≥0) ^ rankOfDiscrBdd N + 1 variable {N} (hK : \|discr K\| ≤ N)	Mathlib/NumberTheory/NumberField/Discriminant.lean	279	302	theorem rank_le_rankOfDiscrBdd : finrank ℚ K ≤ rankOfDiscrBdd N := by	have h_nz : N ≠ 0 := by refine fun h ↦ discr_ne_zero K ?_ rwa [h, Nat.cast_zero, abs_nonpos_iff] at hK have h₂ : 1 < 3 * π / 4 := by rw [_root_.lt_div_iff (by positivity), ← _root_.div_lt_iff' (by positivity), one_mul] linarith [Real.pi_gt_three] obtain h \| h := lt_or_le 1 (finrank ℚ K) · apply le_max_of_le_right rw [Nat.le_floor_iff] · have h := le_trans (abs_discr_ge h) (Int.cast_le.mpr hK) contrapose! h rw [← Real.rpow_natCast] rw [Real.log_div_log] at h refine lt_of_le_of_lt ?_ (mul_lt_mul_of_pos_left (Real.rpow_lt_rpow_of_exponent_lt h₂ h) (by positivity : (0:ℝ) < 4 / 9)) rw [Real.rpow_logb (lt_trans zero_lt_one h₂) (ne_of_gt h₂) (by positivity), ← mul_assoc, ← inv_div, inv_mul_cancel (by norm_num), one_mul, Int.cast_natCast] · refine div_nonneg (Real.log_nonneg ?_) (Real.log_nonneg (le_of_lt h₂)) rw [mul_comm, ← mul_div_assoc, _root_.le_div_iff (by positivity), one_mul, ← _root_.div_le_iff (by positivity)] exact le_trans (by norm_num) (Nat.one_le_cast.mpr (Nat.one_le_iff_ne_zero.mpr h_nz)) · exact le_max_of_le_left h
import Mathlib.LinearAlgebra.Matrix.Charpoly.Coeff import Mathlib.LinearAlgebra.Matrix.ToLin #align_import linear_algebra.matrix.charpoly.linear_map from "leanprover-community/mathlib"@"62c0a4ef1441edb463095ea02a06e87f3dfe135c" variable {ι : Type} [Fintype ι] variable {M : Type} [AddCommGroup M] (R : Type) [CommRing R] [Module R M] (I : Ideal R) variable (b : ι → M) (hb : Submodule.span R (Set.range b) = ⊤) open Polynomial Matrix def PiToModule.fromMatrix [DecidableEq ι] : Matrix ι ι R →ₗ[R] (ι → R) →ₗ[R] M := (LinearMap.llcomp R _ _ _ (Fintype.total R R b)).comp algEquivMatrix'.symm.toLinearMap #align pi_to_module.from_matrix PiToModule.fromMatrix theorem PiToModule.fromMatrix_apply [DecidableEq ι] (A : Matrix ι ι R) (w : ι → R) : PiToModule.fromMatrix R b A w = Fintype.total R R b (A ᵥ w) := rfl #align pi_to_module.from_matrix_apply PiToModule.fromMatrix_apply	Mathlib/LinearAlgebra/Matrix/Charpoly/LinearMap.lean	43	46	theorem PiToModule.fromMatrix_apply_single_one [DecidableEq ι] (A : Matrix ι ι R) (j : ι) : PiToModule.fromMatrix R b A (Pi.single j 1) = ∑ i : ι, A i j • b i := by	rw [PiToModule.fromMatrix_apply, Fintype.total_apply, Matrix.mulVec_single] simp_rw [mul_one]
import Mathlib.Topology.Order.ProjIcc import Mathlib.Topology.ContinuousFunction.Ordered import Mathlib.Topology.CompactOpen import Mathlib.Topology.UnitInterval #align_import topology.homotopy.basic from "leanprover-community/mathlib"@"11c53f174270aa43140c0b26dabce5fc4a253e80" noncomputable section universe u v w x variable {F : Type} {X : Type u} {Y : Type v} {Z : Type w} {Z' : Type x} {ι : Type} variable [TopologicalSpace X] [TopologicalSpace Y] [TopologicalSpace Z] [TopologicalSpace Z'] open unitInterval namespace ContinuousMap structure Homotopy (f₀ f₁ : C(X, Y)) extends C(I × X, Y) where map_zero_left : ∀ x, toFun (0, x) = f₀ x map_one_left : ∀ x, toFun (1, x) = f₁ x #align continuous_map.homotopy ContinuousMap.Homotopy section class HomotopyLike {X Y : outParam Type} [TopologicalSpace X] [TopologicalSpace Y] (F : Type) (f₀ f₁ : outParam <\| C(X, Y)) [FunLike F (I × X) Y] extends ContinuousMapClass F (I × X) Y : Prop where map_zero_left (f : F) : ∀ x, f (0, x) = f₀ x map_one_left (f : F) : ∀ x, f (1, x) = f₁ x #align continuous_map.homotopy_like ContinuousMap.HomotopyLike end namespace Homotopy section variable {f₀ f₁ : C(X, Y)} instance instFunLike : FunLike (Homotopy f₀ f₁) (I × X) Y where coe f := f.toFun coe_injective' f g h := by obtain ⟨⟨_, _⟩, _⟩ := f obtain ⟨⟨_, _⟩, _⟩ := g congr instance : HomotopyLike (Homotopy f₀ f₁) f₀ f₁ where map_continuous f := f.continuous_toFun map_zero_left f := f.map_zero_left map_one_left f := f.map_one_left @[ext] theorem ext {F G : Homotopy f₀ f₁} (h : ∀ x, F x = G x) : F = G := DFunLike.ext _ _ h #align continuous_map.homotopy.ext ContinuousMap.Homotopy.ext def Simps.apply (F : Homotopy f₀ f₁) : I × X → Y := F #align continuous_map.homotopy.simps.apply ContinuousMap.Homotopy.Simps.apply initialize_simps_projections Homotopy (toFun → apply, -toContinuousMap) protected theorem continuous (F : Homotopy f₀ f₁) : Continuous F := F.continuous_toFun #align continuous_map.homotopy.continuous ContinuousMap.Homotopy.continuous @[simp] theorem apply_zero (F : Homotopy f₀ f₁) (x : X) : F (0, x) = f₀ x := F.map_zero_left x #align continuous_map.homotopy.apply_zero ContinuousMap.Homotopy.apply_zero @[simp] theorem apply_one (F : Homotopy f₀ f₁) (x : X) : F (1, x) = f₁ x := F.map_one_left x #align continuous_map.homotopy.apply_one ContinuousMap.Homotopy.apply_one @[simp] theorem coe_toContinuousMap (F : Homotopy f₀ f₁) : ⇑F.toContinuousMap = F := rfl #align continuous_map.homotopy.coe_to_continuous_map ContinuousMap.Homotopy.coe_toContinuousMap def curry (F : Homotopy f₀ f₁) : C(I, C(X, Y)) := F.toContinuousMap.curry #align continuous_map.homotopy.curry ContinuousMap.Homotopy.curry @[simp] theorem curry_apply (F : Homotopy f₀ f₁) (t : I) (x : X) : F.curry t x = F (t, x) := rfl #align continuous_map.homotopy.curry_apply ContinuousMap.Homotopy.curry_apply def extend (F : Homotopy f₀ f₁) : C(ℝ, C(X, Y)) := F.curry.IccExtend zero_le_one #align continuous_map.homotopy.extend ContinuousMap.Homotopy.extend	Mathlib/Topology/Homotopy/Basic.lean	166	169	theorem extend_apply_of_le_zero (F : Homotopy f₀ f₁) {t : ℝ} (ht : t ≤ 0) (x : X) : F.extend t x = f₀ x := by	rw [← F.apply_zero] exact ContinuousMap.congr_fun (Set.IccExtend_of_le_left (zero_le_one' ℝ) F.curry ht) x
import Mathlib.Data.List.Lattice import Mathlib.Data.List.Range import Mathlib.Data.Bool.Basic #align_import data.list.intervals from "leanprover-community/mathlib"@"7b78d1776212a91ecc94cf601f83bdcc46b04213" open Nat namespace List def Ico (n m : ℕ) : List ℕ := range' n (m - n) #align list.Ico List.Ico namespace Ico theorem zero_bot (n : ℕ) : Ico 0 n = range n := by rw [Ico, Nat.sub_zero, range_eq_range'] #align list.Ico.zero_bot List.Ico.zero_bot @[simp] theorem length (n m : ℕ) : length (Ico n m) = m - n := by dsimp [Ico] simp [length_range', autoParam] #align list.Ico.length List.Ico.length theorem pairwise_lt (n m : ℕ) : Pairwise (· < ·) (Ico n m) := by dsimp [Ico] simp [pairwise_lt_range', autoParam] #align list.Ico.pairwise_lt List.Ico.pairwise_lt theorem nodup (n m : ℕ) : Nodup (Ico n m) := by dsimp [Ico] simp [nodup_range', autoParam] #align list.Ico.nodup List.Ico.nodup @[simp] theorem mem {n m l : ℕ} : l ∈ Ico n m ↔ n ≤ l ∧ l < m := by suffices n ≤ l ∧ l < n + (m - n) ↔ n ≤ l ∧ l < m by simp [Ico, this] rcases le_total n m with hnm \| hmn · rw [Nat.add_sub_cancel' hnm] · rw [Nat.sub_eq_zero_iff_le.mpr hmn, Nat.add_zero] exact and_congr_right fun hnl => Iff.intro (fun hln => (not_le_of_gt hln hnl).elim) fun hlm => lt_of_lt_of_le hlm hmn #align list.Ico.mem List.Ico.mem theorem eq_nil_of_le {n m : ℕ} (h : m ≤ n) : Ico n m = [] := by simp [Ico, Nat.sub_eq_zero_iff_le.mpr h] #align list.Ico.eq_nil_of_le List.Ico.eq_nil_of_le	Mathlib/Data/List/Intervals.lean	76	77	theorem map_add (n m k : ℕ) : (Ico n m).map (k + ·) = Ico (n + k) (m + k) := by	rw [Ico, Ico, map_add_range', Nat.add_sub_add_right m k, Nat.add_comm n k]
import Mathlib.Data.Matrix.Invertible import Mathlib.LinearAlgebra.Matrix.Adjugate import Mathlib.LinearAlgebra.FiniteDimensional #align_import linear_algebra.matrix.nonsingular_inverse from "leanprover-community/mathlib"@"722b3b152ddd5e0cf21c0a29787c76596cb6b422" namespace Matrix universe u u' v variable {l : Type*} {m : Type u} {n : Type u'} {α : Type v} open Matrix Equiv Equiv.Perm Finset section Inv variable [Fintype n] [DecidableEq n] [CommRing α] variable (A : Matrix n n α) (B : Matrix n n α) theorem isUnit_det_transpose (h : IsUnit A.det) : IsUnit Aᵀ.det := by rw [det_transpose] exact h #align matrix.is_unit_det_transpose Matrix.isUnit_det_transpose noncomputable instance inv : Inv (Matrix n n α) := ⟨fun A => Ring.inverse A.det • A.adjugate⟩ theorem inv_def (A : Matrix n n α) : A⁻¹ = Ring.inverse A.det • A.adjugate := rfl #align matrix.inv_def Matrix.inv_def theorem nonsing_inv_apply_not_isUnit (h : ¬IsUnit A.det) : A⁻¹ = 0 := by rw [inv_def, Ring.inverse_non_unit _ h, zero_smul] #align matrix.nonsing_inv_apply_not_is_unit Matrix.nonsing_inv_apply_not_isUnit	Mathlib/LinearAlgebra/Matrix/NonsingularInverse.lean	225	226	theorem nonsing_inv_apply (h : IsUnit A.det) : A⁻¹ = (↑h.unit⁻¹ : α) • A.adjugate := by	rw [inv_def, ← Ring.inverse_unit h.unit, IsUnit.unit_spec]
import Mathlib.Algebra.ContinuedFractions.ContinuantsRecurrence import Mathlib.Algebra.ContinuedFractions.TerminatedStable import Mathlib.Tactic.FieldSimp import Mathlib.Tactic.Ring #align_import algebra.continued_fractions.convergents_equiv from "leanprover-community/mathlib"@"a7e36e48519ab281320c4d192da6a7b348ce40ad" variable {K : Type} {n : ℕ} namespace GeneralizedContinuedFraction variable {g : GeneralizedContinuedFraction K} {s : Stream'.Seq <\| Pair K} section Squash section WithDivisionRing variable [DivisionRing K] def squashSeq (s : Stream'.Seq <\| Pair K) (n : ℕ) : Stream'.Seq (Pair K) := match Prod.mk (s.get? n) (s.get? (n + 1)) with \| ⟨some gp_n, some gp_succ_n⟩ => Stream'.Seq.nats.zipWith -- return the squashed value at position `n`; otherwise, do nothing. (fun n' gp => if n' = n then ⟨gp_n.a, gp_n.b + gp_succ_n.a / gp_succ_n.b⟩ else gp) s \| _ => s #align generalized_continued_fraction.squash_seq GeneralizedContinuedFraction.squashSeq theorem squashSeq_eq_self_of_terminated (terminated_at_succ_n : s.TerminatedAt (n + 1)) : squashSeq s n = s := by change s.get? (n + 1) = none at terminated_at_succ_n cases s_nth_eq : s.get? n <;> simp only [, squashSeq] #align generalized_continued_fraction.squash_seq_eq_self_of_terminated GeneralizedContinuedFraction.squashSeq_eq_self_of_terminated theorem squashSeq_nth_of_not_terminated {gp_n gp_succ_n : Pair K} (s_nth_eq : s.get? n = some gp_n) (s_succ_nth_eq : s.get? (n + 1) = some gp_succ_n) : (squashSeq s n).get? n = some ⟨gp_n.a, gp_n.b + gp_succ_n.a / gp_succ_n.b⟩ := by simp [, squashSeq] #align generalized_continued_fraction.squash_seq_nth_of_not_terminated GeneralizedContinuedFraction.squashSeq_nth_of_not_terminated theorem squashSeq_nth_of_lt {m : ℕ} (m_lt_n : m < n) : (squashSeq s n).get? m = s.get? m := by cases s_succ_nth_eq : s.get? (n + 1) with \| none => rw [squashSeq_eq_self_of_terminated s_succ_nth_eq] \| some => obtain ⟨gp_n, s_nth_eq⟩ : ∃ gp_n, s.get? n = some gp_n := s.ge_stable n.le_succ s_succ_nth_eq obtain ⟨gp_m, s_mth_eq⟩ : ∃ gp_m, s.get? m = some gp_m := s.ge_stable (le_of_lt m_lt_n) s_nth_eq simp [, squashSeq, m_lt_n.ne] #align generalized_continued_fraction.squash_seq_nth_of_lt GeneralizedContinuedFraction.squashSeq_nth_of_lt theorem squashSeq_succ_n_tail_eq_squashSeq_tail_n : (squashSeq s (n + 1)).tail = squashSeq s.tail n := by cases s_succ_succ_nth_eq : s.get? (n + 2) with \| none => cases s_succ_nth_eq : s.get? (n + 1) <;> simp only [squashSeq, Stream'.Seq.get?_tail, s_succ_nth_eq, s_succ_succ_nth_eq] \| some gp_succ_succ_n => obtain ⟨gp_succ_n, s_succ_nth_eq⟩ : ∃ gp_succ_n, s.get? (n + 1) = some gp_succ_n := s.ge_stable (n + 1).le_succ s_succ_succ_nth_eq -- apply extensionality with `m` and continue by cases `m = n`. ext1 m cases' Decidable.em (m = n) with m_eq_n m_ne_n · simp [, squashSeq] · cases s_succ_mth_eq : s.get? (m + 1) · simp only [, squashSeq, Stream'.Seq.get?_tail, Stream'.Seq.get?_zipWith, Option.map₂_none_right] · simp [*, squashSeq] #align generalized_continued_fraction.squash_seq_succ_n_tail_eq_squash_seq_tail_n GeneralizedContinuedFraction.squashSeq_succ_n_tail_eq_squashSeq_tail_n theorem succ_succ_nth_convergent'_aux_eq_succ_nth_convergent'_aux_squashSeq : convergents'Aux s (n + 2) = convergents'Aux (squashSeq s n) (n + 1) := by cases s_succ_nth_eq : s.get? <\| n + 1 with \| none => rw [squashSeq_eq_self_of_terminated s_succ_nth_eq, convergents'Aux_stable_step_of_terminated s_succ_nth_eq] \| some gp_succ_n => induction n generalizing s gp_succ_n with \| zero => obtain ⟨gp_head, s_head_eq⟩ : ∃ gp_head, s.head = some gp_head := s.ge_stable zero_le_one s_succ_nth_eq have : (squashSeq s 0).head = some ⟨gp_head.a, gp_head.b + gp_succ_n.a / gp_succ_n.b⟩ := squashSeq_nth_of_not_terminated s_head_eq s_succ_nth_eq simp_all [convergents'Aux, Stream'.Seq.head, Stream'.Seq.get?_tail] \| succ m IH => obtain ⟨gp_head, s_head_eq⟩ : ∃ gp_head, s.head = some gp_head := s.ge_stable (m + 2).zero_le s_succ_nth_eq suffices gp_head.a / (gp_head.b + convergents'Aux s.tail (m + 2)) = convergents'Aux (squashSeq s (m + 1)) (m + 2) by simpa only [convergents'Aux, s_head_eq] have : convergents'Aux s.tail (m + 2) = convergents'Aux (squashSeq s.tail m) (m + 1) := by refine IH gp_succ_n ?_ simpa [Stream'.Seq.get?_tail] using s_succ_nth_eq have : (squashSeq s (m + 1)).head = some gp_head := (squashSeq_nth_of_lt m.succ_pos).trans s_head_eq simp_all [convergents'Aux, squashSeq_succ_n_tail_eq_squashSeq_tail_n] #align generalized_continued_fraction.succ_succ_nth_convergent'_aux_eq_succ_nth_convergent'_aux_squash_seq GeneralizedContinuedFraction.succ_succ_nth_convergent'_aux_eq_succ_nth_convergent'_aux_squashSeq def squashGCF (g : GeneralizedContinuedFraction K) : ℕ → GeneralizedContinuedFraction K \| 0 => match g.s.get? 0 with \| none => g \| some gp => ⟨g.h + gp.a / gp.b, g.s⟩ \| n + 1 => ⟨g.h, squashSeq g.s n⟩ #align generalized_continued_fraction.squash_gcf GeneralizedContinuedFraction.squashGCF theorem squashGCF_eq_self_of_terminated (terminated_at_n : TerminatedAt g n) : squashGCF g n = g := by cases n with \| zero => change g.s.get? 0 = none at terminated_at_n simp only [convergents', squashGCF, convergents'Aux, terminated_at_n] \| succ => cases g simp only [squashGCF, mk.injEq, true_and] exact squashSeq_eq_self_of_terminated terminated_at_n #align generalized_continued_fraction.squash_gcf_eq_self_of_terminated GeneralizedContinuedFraction.squashGCF_eq_self_of_terminated	Mathlib/Algebra/ContinuedFractions/ConvergentsEquiv.lean	217	219	theorem squashGCF_nth_of_lt {m : ℕ} (m_lt_n : m < n) : (squashGCF g (n + 1)).s.get? m = g.s.get? m := by	simp only [squashGCF, squashSeq_nth_of_lt m_lt_n, Nat.add_eq, add_zero]
import Mathlib.Analysis.InnerProductSpace.TwoDim import Mathlib.Geometry.Euclidean.Angle.Unoriented.Basic #align_import geometry.euclidean.angle.oriented.basic from "leanprover-community/mathlib"@"f0c8bf9245297a541f468be517f1bde6195105e9" noncomputable section open FiniteDimensional Complex open scoped Real RealInnerProductSpace ComplexConjugate namespace Orientation attribute [local instance] Complex.finrank_real_complex_fact variable {V V' : Type} variable [NormedAddCommGroup V] [NormedAddCommGroup V'] variable [InnerProductSpace ℝ V] [InnerProductSpace ℝ V'] variable [Fact (finrank ℝ V = 2)] [Fact (finrank ℝ V' = 2)] (o : Orientation ℝ V (Fin 2)) local notation "ω" => o.areaForm def oangle (x y : V) : Real.Angle := Complex.arg (o.kahler x y) #align orientation.oangle Orientation.oangle theorem continuousAt_oangle {x : V × V} (hx1 : x.1 ≠ 0) (hx2 : x.2 ≠ 0) : ContinuousAt (fun y : V × V => o.oangle y.1 y.2) x := by refine (Complex.continuousAt_arg_coe_angle ?_).comp ?_ · exact o.kahler_ne_zero hx1 hx2 exact ((continuous_ofReal.comp continuous_inner).add ((continuous_ofReal.comp o.areaForm'.continuous₂).mul continuous_const)).continuousAt #align orientation.continuous_at_oangle Orientation.continuousAt_oangle @[simp] theorem oangle_zero_left (x : V) : o.oangle 0 x = 0 := by simp [oangle] #align orientation.oangle_zero_left Orientation.oangle_zero_left @[simp] theorem oangle_zero_right (x : V) : o.oangle x 0 = 0 := by simp [oangle] #align orientation.oangle_zero_right Orientation.oangle_zero_right @[simp] theorem oangle_self (x : V) : o.oangle x x = 0 := by rw [oangle, kahler_apply_self, ← ofReal_pow] convert QuotientAddGroup.mk_zero (AddSubgroup.zmultiples (2 π)) apply arg_ofReal_of_nonneg positivity #align orientation.oangle_self Orientation.oangle_self theorem left_ne_zero_of_oangle_ne_zero {x y : V} (h : o.oangle x y ≠ 0) : x ≠ 0 := by rintro rfl; simp at h #align orientation.left_ne_zero_of_oangle_ne_zero Orientation.left_ne_zero_of_oangle_ne_zero theorem right_ne_zero_of_oangle_ne_zero {x y : V} (h : o.oangle x y ≠ 0) : y ≠ 0 := by rintro rfl; simp at h #align orientation.right_ne_zero_of_oangle_ne_zero Orientation.right_ne_zero_of_oangle_ne_zero theorem ne_of_oangle_ne_zero {x y : V} (h : o.oangle x y ≠ 0) : x ≠ y := by rintro rfl; simp at h #align orientation.ne_of_oangle_ne_zero Orientation.ne_of_oangle_ne_zero theorem left_ne_zero_of_oangle_eq_pi {x y : V} (h : o.oangle x y = π) : x ≠ 0 := o.left_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_ne_zero : o.oangle x y ≠ 0) #align orientation.left_ne_zero_of_oangle_eq_pi Orientation.left_ne_zero_of_oangle_eq_pi theorem right_ne_zero_of_oangle_eq_pi {x y : V} (h : o.oangle x y = π) : y ≠ 0 := o.right_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_ne_zero : o.oangle x y ≠ 0) #align orientation.right_ne_zero_of_oangle_eq_pi Orientation.right_ne_zero_of_oangle_eq_pi theorem ne_of_oangle_eq_pi {x y : V} (h : o.oangle x y = π) : x ≠ y := o.ne_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_ne_zero : o.oangle x y ≠ 0) #align orientation.ne_of_oangle_eq_pi Orientation.ne_of_oangle_eq_pi theorem left_ne_zero_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = (π / 2 : ℝ)) : x ≠ 0 := o.left_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.left_ne_zero_of_oangle_eq_pi_div_two Orientation.left_ne_zero_of_oangle_eq_pi_div_two theorem right_ne_zero_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = (π / 2 : ℝ)) : y ≠ 0 := o.right_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.right_ne_zero_of_oangle_eq_pi_div_two Orientation.right_ne_zero_of_oangle_eq_pi_div_two theorem ne_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = (π / 2 : ℝ)) : x ≠ y := o.ne_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.ne_of_oangle_eq_pi_div_two Orientation.ne_of_oangle_eq_pi_div_two theorem left_ne_zero_of_oangle_eq_neg_pi_div_two {x y : V} (h : o.oangle x y = (-π / 2 : ℝ)) : x ≠ 0 := o.left_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.neg_pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.left_ne_zero_of_oangle_eq_neg_pi_div_two Orientation.left_ne_zero_of_oangle_eq_neg_pi_div_two theorem right_ne_zero_of_oangle_eq_neg_pi_div_two {x y : V} (h : o.oangle x y = (-π / 2 : ℝ)) : y ≠ 0 := o.right_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.neg_pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.right_ne_zero_of_oangle_eq_neg_pi_div_two Orientation.right_ne_zero_of_oangle_eq_neg_pi_div_two theorem ne_of_oangle_eq_neg_pi_div_two {x y : V} (h : o.oangle x y = (-π / 2 : ℝ)) : x ≠ y := o.ne_of_oangle_ne_zero (h.symm ▸ Real.Angle.neg_pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.ne_of_oangle_eq_neg_pi_div_two Orientation.ne_of_oangle_eq_neg_pi_div_two theorem left_ne_zero_of_oangle_sign_ne_zero {x y : V} (h : (o.oangle x y).sign ≠ 0) : x ≠ 0 := o.left_ne_zero_of_oangle_ne_zero (Real.Angle.sign_ne_zero_iff.1 h).1 #align orientation.left_ne_zero_of_oangle_sign_ne_zero Orientation.left_ne_zero_of_oangle_sign_ne_zero theorem right_ne_zero_of_oangle_sign_ne_zero {x y : V} (h : (o.oangle x y).sign ≠ 0) : y ≠ 0 := o.right_ne_zero_of_oangle_ne_zero (Real.Angle.sign_ne_zero_iff.1 h).1 #align orientation.right_ne_zero_of_oangle_sign_ne_zero Orientation.right_ne_zero_of_oangle_sign_ne_zero theorem ne_of_oangle_sign_ne_zero {x y : V} (h : (o.oangle x y).sign ≠ 0) : x ≠ y := o.ne_of_oangle_ne_zero (Real.Angle.sign_ne_zero_iff.1 h).1 #align orientation.ne_of_oangle_sign_ne_zero Orientation.ne_of_oangle_sign_ne_zero theorem left_ne_zero_of_oangle_sign_eq_one {x y : V} (h : (o.oangle x y).sign = 1) : x ≠ 0 := o.left_ne_zero_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.left_ne_zero_of_oangle_sign_eq_one Orientation.left_ne_zero_of_oangle_sign_eq_one theorem right_ne_zero_of_oangle_sign_eq_one {x y : V} (h : (o.oangle x y).sign = 1) : y ≠ 0 := o.right_ne_zero_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.right_ne_zero_of_oangle_sign_eq_one Orientation.right_ne_zero_of_oangle_sign_eq_one theorem ne_of_oangle_sign_eq_one {x y : V} (h : (o.oangle x y).sign = 1) : x ≠ y := o.ne_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.ne_of_oangle_sign_eq_one Orientation.ne_of_oangle_sign_eq_one theorem left_ne_zero_of_oangle_sign_eq_neg_one {x y : V} (h : (o.oangle x y).sign = -1) : x ≠ 0 := o.left_ne_zero_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.left_ne_zero_of_oangle_sign_eq_neg_one Orientation.left_ne_zero_of_oangle_sign_eq_neg_one theorem right_ne_zero_of_oangle_sign_eq_neg_one {x y : V} (h : (o.oangle x y).sign = -1) : y ≠ 0 := o.right_ne_zero_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.right_ne_zero_of_oangle_sign_eq_neg_one Orientation.right_ne_zero_of_oangle_sign_eq_neg_one theorem ne_of_oangle_sign_eq_neg_one {x y : V} (h : (o.oangle x y).sign = -1) : x ≠ y := o.ne_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.ne_of_oangle_sign_eq_neg_one Orientation.ne_of_oangle_sign_eq_neg_one theorem oangle_rev (x y : V) : o.oangle y x = -o.oangle x y := by simp only [oangle, o.kahler_swap y x, Complex.arg_conj_coe_angle] #align orientation.oangle_rev Orientation.oangle_rev @[simp] theorem oangle_add_oangle_rev (x y : V) : o.oangle x y + o.oangle y x = 0 := by simp [o.oangle_rev y x] #align orientation.oangle_add_oangle_rev Orientation.oangle_add_oangle_rev theorem oangle_neg_left {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : o.oangle (-x) y = o.oangle x y + π := by simp only [oangle, map_neg] convert Complex.arg_neg_coe_angle _ exact o.kahler_ne_zero hx hy #align orientation.oangle_neg_left Orientation.oangle_neg_left theorem oangle_neg_right {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : o.oangle x (-y) = o.oangle x y + π := by simp only [oangle, map_neg] convert Complex.arg_neg_coe_angle _ exact o.kahler_ne_zero hx hy #align orientation.oangle_neg_right Orientation.oangle_neg_right @[simp] theorem two_zsmul_oangle_neg_left (x y : V) : (2 : ℤ) • o.oangle (-x) y = (2 : ℤ) • o.oangle x y := by by_cases hx : x = 0 · simp [hx] · by_cases hy : y = 0 · simp [hy] · simp [o.oangle_neg_left hx hy] #align orientation.two_zsmul_oangle_neg_left Orientation.two_zsmul_oangle_neg_left @[simp] theorem two_zsmul_oangle_neg_right (x y : V) : (2 : ℤ) • o.oangle x (-y) = (2 : ℤ) • o.oangle x y := by by_cases hx : x = 0 · simp [hx] · by_cases hy : y = 0 · simp [hy] · simp [o.oangle_neg_right hx hy] #align orientation.two_zsmul_oangle_neg_right Orientation.two_zsmul_oangle_neg_right @[simp] theorem oangle_neg_neg (x y : V) : o.oangle (-x) (-y) = o.oangle x y := by simp [oangle] #align orientation.oangle_neg_neg Orientation.oangle_neg_neg theorem oangle_neg_left_eq_neg_right (x y : V) : o.oangle (-x) y = o.oangle x (-y) := by rw [← neg_neg y, oangle_neg_neg, neg_neg] #align orientation.oangle_neg_left_eq_neg_right Orientation.oangle_neg_left_eq_neg_right @[simp] theorem oangle_neg_self_left {x : V} (hx : x ≠ 0) : o.oangle (-x) x = π := by simp [oangle_neg_left, hx] #align orientation.oangle_neg_self_left Orientation.oangle_neg_self_left @[simp] theorem oangle_neg_self_right {x : V} (hx : x ≠ 0) : o.oangle x (-x) = π := by simp [oangle_neg_right, hx] #align orientation.oangle_neg_self_right Orientation.oangle_neg_self_right -- @[simp] -- Porting note (#10618): simp can prove this theorem two_zsmul_oangle_neg_self_left (x : V) : (2 : ℤ) • o.oangle (-x) x = 0 := by by_cases hx : x = 0 <;> simp [hx] #align orientation.two_zsmul_oangle_neg_self_left Orientation.two_zsmul_oangle_neg_self_left -- @[simp] -- Porting note (#10618): simp can prove this theorem two_zsmul_oangle_neg_self_right (x : V) : (2 : ℤ) • o.oangle x (-x) = 0 := by by_cases hx : x = 0 <;> simp [hx] #align orientation.two_zsmul_oangle_neg_self_right Orientation.two_zsmul_oangle_neg_self_right @[simp] theorem oangle_add_oangle_rev_neg_left (x y : V) : o.oangle (-x) y + o.oangle (-y) x = 0 := by rw [oangle_neg_left_eq_neg_right, oangle_rev, add_left_neg] #align orientation.oangle_add_oangle_rev_neg_left Orientation.oangle_add_oangle_rev_neg_left @[simp] theorem oangle_add_oangle_rev_neg_right (x y : V) : o.oangle x (-y) + o.oangle y (-x) = 0 := by rw [o.oangle_rev (-x), oangle_neg_left_eq_neg_right, add_neg_self] #align orientation.oangle_add_oangle_rev_neg_right Orientation.oangle_add_oangle_rev_neg_right @[simp] theorem oangle_smul_left_of_pos (x y : V) {r : ℝ} (hr : 0 < r) : o.oangle (r • x) y = o.oangle x y := by simp [oangle, Complex.arg_real_mul _ hr] #align orientation.oangle_smul_left_of_pos Orientation.oangle_smul_left_of_pos @[simp] theorem oangle_smul_right_of_pos (x y : V) {r : ℝ} (hr : 0 < r) : o.oangle x (r • y) = o.oangle x y := by simp [oangle, Complex.arg_real_mul _ hr] #align orientation.oangle_smul_right_of_pos Orientation.oangle_smul_right_of_pos @[simp] theorem oangle_smul_left_of_neg (x y : V) {r : ℝ} (hr : r < 0) : o.oangle (r • x) y = o.oangle (-x) y := by rw [← neg_neg r, neg_smul, ← smul_neg, o.oangle_smul_left_of_pos _ _ (neg_pos_of_neg hr)] #align orientation.oangle_smul_left_of_neg Orientation.oangle_smul_left_of_neg @[simp] theorem oangle_smul_right_of_neg (x y : V) {r : ℝ} (hr : r < 0) : o.oangle x (r • y) = o.oangle x (-y) := by rw [← neg_neg r, neg_smul, ← smul_neg, o.oangle_smul_right_of_pos _ _ (neg_pos_of_neg hr)] #align orientation.oangle_smul_right_of_neg Orientation.oangle_smul_right_of_neg @[simp] theorem oangle_smul_left_self_of_nonneg (x : V) {r : ℝ} (hr : 0 ≤ r) : o.oangle (r • x) x = 0 := by rcases hr.lt_or_eq with (h \| h) · simp [h] · simp [h.symm] #align orientation.oangle_smul_left_self_of_nonneg Orientation.oangle_smul_left_self_of_nonneg @[simp] theorem oangle_smul_right_self_of_nonneg (x : V) {r : ℝ} (hr : 0 ≤ r) : o.oangle x (r • x) = 0 := by rcases hr.lt_or_eq with (h \| h) · simp [h] · simp [h.symm] #align orientation.oangle_smul_right_self_of_nonneg Orientation.oangle_smul_right_self_of_nonneg @[simp] theorem oangle_smul_smul_self_of_nonneg (x : V) {r₁ r₂ : ℝ} (hr₁ : 0 ≤ r₁) (hr₂ : 0 ≤ r₂) : o.oangle (r₁ • x) (r₂ • x) = 0 := by rcases hr₁.lt_or_eq with (h \| h) · simp [h, hr₂] · simp [h.symm] #align orientation.oangle_smul_smul_self_of_nonneg Orientation.oangle_smul_smul_self_of_nonneg @[simp] theorem two_zsmul_oangle_smul_left_of_ne_zero (x y : V) {r : ℝ} (hr : r ≠ 0) : (2 : ℤ) • o.oangle (r • x) y = (2 : ℤ) • o.oangle x y := by rcases hr.lt_or_lt with (h \| h) <;> simp [h] #align orientation.two_zsmul_oangle_smul_left_of_ne_zero Orientation.two_zsmul_oangle_smul_left_of_ne_zero @[simp] theorem two_zsmul_oangle_smul_right_of_ne_zero (x y : V) {r : ℝ} (hr : r ≠ 0) : (2 : ℤ) • o.oangle x (r • y) = (2 : ℤ) • o.oangle x y := by rcases hr.lt_or_lt with (h \| h) <;> simp [h] #align orientation.two_zsmul_oangle_smul_right_of_ne_zero Orientation.two_zsmul_oangle_smul_right_of_ne_zero @[simp] theorem two_zsmul_oangle_smul_left_self (x : V) {r : ℝ} : (2 : ℤ) • o.oangle (r • x) x = 0 := by rcases lt_or_le r 0 with (h \| h) <;> simp [h] #align orientation.two_zsmul_oangle_smul_left_self Orientation.two_zsmul_oangle_smul_left_self @[simp] theorem two_zsmul_oangle_smul_right_self (x : V) {r : ℝ} : (2 : ℤ) • o.oangle x (r • x) = 0 := by rcases lt_or_le r 0 with (h \| h) <;> simp [h] #align orientation.two_zsmul_oangle_smul_right_self Orientation.two_zsmul_oangle_smul_right_self @[simp] theorem two_zsmul_oangle_smul_smul_self (x : V) {r₁ r₂ : ℝ} : (2 : ℤ) • o.oangle (r₁ • x) (r₂ • x) = 0 := by by_cases h : r₁ = 0 <;> simp [h] #align orientation.two_zsmul_oangle_smul_smul_self Orientation.two_zsmul_oangle_smul_smul_self theorem two_zsmul_oangle_left_of_span_eq {x y : V} (z : V) (h : (ℝ ∙ x) = ℝ ∙ y) : (2 : ℤ) • o.oangle x z = (2 : ℤ) • o.oangle y z := by rw [Submodule.span_singleton_eq_span_singleton] at h rcases h with ⟨r, rfl⟩ exact (o.two_zsmul_oangle_smul_left_of_ne_zero _ _ (Units.ne_zero _)).symm #align orientation.two_zsmul_oangle_left_of_span_eq Orientation.two_zsmul_oangle_left_of_span_eq theorem two_zsmul_oangle_right_of_span_eq (x : V) {y z : V} (h : (ℝ ∙ y) = ℝ ∙ z) : (2 : ℤ) • o.oangle x y = (2 : ℤ) • o.oangle x z := by rw [Submodule.span_singleton_eq_span_singleton] at h rcases h with ⟨r, rfl⟩ exact (o.two_zsmul_oangle_smul_right_of_ne_zero _ _ (Units.ne_zero _)).symm #align orientation.two_zsmul_oangle_right_of_span_eq Orientation.two_zsmul_oangle_right_of_span_eq theorem two_zsmul_oangle_of_span_eq_of_span_eq {w x y z : V} (hwx : (ℝ ∙ w) = ℝ ∙ x) (hyz : (ℝ ∙ y) = ℝ ∙ z) : (2 : ℤ) • o.oangle w y = (2 : ℤ) • o.oangle x z := by rw [o.two_zsmul_oangle_left_of_span_eq y hwx, o.two_zsmul_oangle_right_of_span_eq x hyz] #align orientation.two_zsmul_oangle_of_span_eq_of_span_eq Orientation.two_zsmul_oangle_of_span_eq_of_span_eq theorem oangle_eq_zero_iff_oangle_rev_eq_zero {x y : V} : o.oangle x y = 0 ↔ o.oangle y x = 0 := by rw [oangle_rev, neg_eq_zero] #align orientation.oangle_eq_zero_iff_oangle_rev_eq_zero Orientation.oangle_eq_zero_iff_oangle_rev_eq_zero theorem oangle_eq_zero_iff_sameRay {x y : V} : o.oangle x y = 0 ↔ SameRay ℝ x y := by rw [oangle, kahler_apply_apply, Complex.arg_coe_angle_eq_iff_eq_toReal, Real.Angle.toReal_zero, Complex.arg_eq_zero_iff] simpa using o.nonneg_inner_and_areaForm_eq_zero_iff_sameRay x y #align orientation.oangle_eq_zero_iff_same_ray Orientation.oangle_eq_zero_iff_sameRay theorem oangle_eq_pi_iff_oangle_rev_eq_pi {x y : V} : o.oangle x y = π ↔ o.oangle y x = π := by rw [oangle_rev, neg_eq_iff_eq_neg, Real.Angle.neg_coe_pi] #align orientation.oangle_eq_pi_iff_oangle_rev_eq_pi Orientation.oangle_eq_pi_iff_oangle_rev_eq_pi theorem oangle_eq_pi_iff_sameRay_neg {x y : V} : o.oangle x y = π ↔ x ≠ 0 ∧ y ≠ 0 ∧ SameRay ℝ x (-y) := by rw [← o.oangle_eq_zero_iff_sameRay] constructor · intro h by_cases hx : x = 0; · simp [hx, Real.Angle.pi_ne_zero.symm] at h by_cases hy : y = 0; · simp [hy, Real.Angle.pi_ne_zero.symm] at h refine ⟨hx, hy, ?_⟩ rw [o.oangle_neg_right hx hy, h, Real.Angle.coe_pi_add_coe_pi] · rintro ⟨hx, hy, h⟩ rwa [o.oangle_neg_right hx hy, ← Real.Angle.sub_coe_pi_eq_add_coe_pi, sub_eq_zero] at h #align orientation.oangle_eq_pi_iff_same_ray_neg Orientation.oangle_eq_pi_iff_sameRay_neg theorem oangle_eq_zero_or_eq_pi_iff_not_linearIndependent {x y : V} : o.oangle x y = 0 ∨ o.oangle x y = π ↔ ¬LinearIndependent ℝ ![x, y] := by rw [oangle_eq_zero_iff_sameRay, oangle_eq_pi_iff_sameRay_neg, sameRay_or_ne_zero_and_sameRay_neg_iff_not_linearIndependent] #align orientation.oangle_eq_zero_or_eq_pi_iff_not_linear_independent Orientation.oangle_eq_zero_or_eq_pi_iff_not_linearIndependent theorem oangle_eq_zero_or_eq_pi_iff_right_eq_smul {x y : V} : o.oangle x y = 0 ∨ o.oangle x y = π ↔ x = 0 ∨ ∃ r : ℝ, y = r • x := by rw [oangle_eq_zero_iff_sameRay, oangle_eq_pi_iff_sameRay_neg] refine ⟨fun h => ?_, fun h => ?_⟩ · rcases h with (h \| ⟨-, -, h⟩) · by_cases hx : x = 0; · simp [hx] obtain ⟨r, -, rfl⟩ := h.exists_nonneg_left hx exact Or.inr ⟨r, rfl⟩ · by_cases hx : x = 0; · simp [hx] obtain ⟨r, -, hy⟩ := h.exists_nonneg_left hx refine Or.inr ⟨-r, ?_⟩ simp [hy] · rcases h with (rfl \| ⟨r, rfl⟩); · simp by_cases hx : x = 0; · simp [hx] rcases lt_trichotomy r 0 with (hr \| hr \| hr) · rw [← neg_smul] exact Or.inr ⟨hx, smul_ne_zero hr.ne hx, SameRay.sameRay_pos_smul_right x (Left.neg_pos_iff.2 hr)⟩ · simp [hr] · exact Or.inl (SameRay.sameRay_pos_smul_right x hr) #align orientation.oangle_eq_zero_or_eq_pi_iff_right_eq_smul Orientation.oangle_eq_zero_or_eq_pi_iff_right_eq_smul theorem oangle_ne_zero_and_ne_pi_iff_linearIndependent {x y : V} : o.oangle x y ≠ 0 ∧ o.oangle x y ≠ π ↔ LinearIndependent ℝ ![x, y] := by rw [← not_or, ← not_iff_not, Classical.not_not, oangle_eq_zero_or_eq_pi_iff_not_linearIndependent] #align orientation.oangle_ne_zero_and_ne_pi_iff_linear_independent Orientation.oangle_ne_zero_and_ne_pi_iff_linearIndependent	Mathlib/Geometry/Euclidean/Angle/Oriented/Basic.lean	478	491	theorem eq_iff_norm_eq_and_oangle_eq_zero (x y : V) : x = y ↔ ‖x‖ = ‖y‖ ∧ o.oangle x y = 0 := by	rw [oangle_eq_zero_iff_sameRay] constructor · rintro rfl simp; rfl · rcases eq_or_ne y 0 with (rfl \| hy) · simp rintro ⟨h₁, h₂⟩ obtain ⟨r, hr, rfl⟩ := h₂.exists_nonneg_right hy have : ‖y‖ ≠ 0 := by simpa using hy obtain rfl : r = 1 := by apply mul_right_cancel₀ this simpa [norm_smul, _root_.abs_of_nonneg hr] using h₁ simp
import Mathlib.Geometry.Manifold.MFDeriv.FDeriv noncomputable section open scoped Manifold open Bundle Set Topology section SpecificFunctions variable {𝕜 : Type} [NontriviallyNormedField 𝕜] {E : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] {H : Type} [TopologicalSpace H] (I : ModelWithCorners 𝕜 E H) {M : Type} [TopologicalSpace M] [ChartedSpace H M] [SmoothManifoldWithCorners I M] {E' : Type} [NormedAddCommGroup E'] [NormedSpace 𝕜 E'] {H' : Type} [TopologicalSpace H'] (I' : ModelWithCorners 𝕜 E' H') {M' : Type} [TopologicalSpace M'] [ChartedSpace H' M'] [SmoothManifoldWithCorners I' M'] {E'' : Type} [NormedAddCommGroup E''] [NormedSpace 𝕜 E''] {H'' : Type} [TopologicalSpace H''] (I'' : ModelWithCorners 𝕜 E'' H'') {M'' : Type} [TopologicalSpace M''] [ChartedSpace H'' M''] [SmoothManifoldWithCorners I'' M''] variable {s : Set M} {x : M} section id theorem hasMFDerivAt_id (x : M) : HasMFDerivAt I I (@id M) x (ContinuousLinearMap.id 𝕜 (TangentSpace I x)) := by refine ⟨continuousAt_id, ?_⟩ have : ∀ᶠ y in 𝓝[range I] (extChartAt I x) x, (extChartAt I x ∘ (extChartAt I x).symm) y = y := by apply Filter.mem_of_superset (extChartAt_target_mem_nhdsWithin I x) mfld_set_tac apply HasFDerivWithinAt.congr_of_eventuallyEq (hasFDerivWithinAt_id _ _) this simp only [mfld_simps] #align has_mfderiv_at_id hasMFDerivAt_id theorem hasMFDerivWithinAt_id (s : Set M) (x : M) : HasMFDerivWithinAt I I (@id M) s x (ContinuousLinearMap.id 𝕜 (TangentSpace I x)) := (hasMFDerivAt_id I x).hasMFDerivWithinAt #align has_mfderiv_within_at_id hasMFDerivWithinAt_id theorem mdifferentiableAt_id : MDifferentiableAt I I (@id M) x := (hasMFDerivAt_id I x).mdifferentiableAt #align mdifferentiable_at_id mdifferentiableAt_id theorem mdifferentiableWithinAt_id : MDifferentiableWithinAt I I (@id M) s x := (mdifferentiableAt_id I).mdifferentiableWithinAt #align mdifferentiable_within_at_id mdifferentiableWithinAt_id theorem mdifferentiable_id : MDifferentiable I I (@id M) := fun _ => mdifferentiableAt_id I #align mdifferentiable_id mdifferentiable_id theorem mdifferentiableOn_id : MDifferentiableOn I I (@id M) s := (mdifferentiable_id I).mdifferentiableOn #align mdifferentiable_on_id mdifferentiableOn_id @[simp, mfld_simps] theorem mfderiv_id : mfderiv I I (@id M) x = ContinuousLinearMap.id 𝕜 (TangentSpace I x) := HasMFDerivAt.mfderiv (hasMFDerivAt_id I x) #align mfderiv_id mfderiv_id theorem mfderivWithin_id (hxs : UniqueMDiffWithinAt I s x) : mfderivWithin I I (@id M) s x = ContinuousLinearMap.id 𝕜 (TangentSpace I x) := by rw [MDifferentiable.mfderivWithin (mdifferentiableAt_id I) hxs] exact mfderiv_id I #align mfderiv_within_id mfderivWithin_id @[simp, mfld_simps]	Mathlib/Geometry/Manifold/MFDeriv/SpecificFunctions.lean	164	164	theorem tangentMap_id : tangentMap I I (id : M → M) = id := by	ext1 ⟨x, v⟩; simp [tangentMap]
import Mathlib.Geometry.Manifold.MFDeriv.FDeriv noncomputable section open scoped Manifold open Bundle Set Topology section SpecificFunctions variable {𝕜 : Type} [NontriviallyNormedField 𝕜] {E : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] {H : Type} [TopologicalSpace H] (I : ModelWithCorners 𝕜 E H) {M : Type} [TopologicalSpace M] [ChartedSpace H M] [SmoothManifoldWithCorners I M] {E' : Type} [NormedAddCommGroup E'] [NormedSpace 𝕜 E'] {H' : Type} [TopologicalSpace H'] (I' : ModelWithCorners 𝕜 E' H') {M' : Type} [TopologicalSpace M'] [ChartedSpace H' M'] [SmoothManifoldWithCorners I' M'] {E'' : Type} [NormedAddCommGroup E''] [NormedSpace 𝕜 E''] {H'' : Type} [TopologicalSpace H''] (I'' : ModelWithCorners 𝕜 E'' H'') {M'' : Type} [TopologicalSpace M''] [ChartedSpace H'' M''] [SmoothManifoldWithCorners I'' M''] variable {s : Set M} {x : M} section Prod theorem hasMFDerivAt_fst (x : M × M') : HasMFDerivAt (I.prod I') I Prod.fst x (ContinuousLinearMap.fst 𝕜 (TangentSpace I x.1) (TangentSpace I' x.2)) := by refine ⟨continuous_fst.continuousAt, ?_⟩ have : ∀ᶠ y in 𝓝[range (I.prod I')] extChartAt (I.prod I') x x, (extChartAt I x.1 ∘ Prod.fst ∘ (extChartAt (I.prod I') x).symm) y = y.1 := by filter_upwards [extChartAt_target_mem_nhdsWithin (I.prod I') x] with y hy rw [extChartAt_prod] at hy exact (extChartAt I x.1).right_inv hy.1 apply HasFDerivWithinAt.congr_of_eventuallyEq hasFDerivWithinAt_fst this -- Porting note: next line was `simp only [mfld_simps]` exact (extChartAt I x.1).right_inv <\| (extChartAt I x.1).map_source (mem_extChartAt_source _ _) #align has_mfderiv_at_fst hasMFDerivAt_fst theorem hasMFDerivWithinAt_fst (s : Set (M × M')) (x : M × M') : HasMFDerivWithinAt (I.prod I') I Prod.fst s x (ContinuousLinearMap.fst 𝕜 (TangentSpace I x.1) (TangentSpace I' x.2)) := (hasMFDerivAt_fst I I' x).hasMFDerivWithinAt #align has_mfderiv_within_at_fst hasMFDerivWithinAt_fst theorem mdifferentiableAt_fst {x : M × M'} : MDifferentiableAt (I.prod I') I Prod.fst x := (hasMFDerivAt_fst I I' x).mdifferentiableAt #align mdifferentiable_at_fst mdifferentiableAt_fst theorem mdifferentiableWithinAt_fst {s : Set (M × M')} {x : M × M'} : MDifferentiableWithinAt (I.prod I') I Prod.fst s x := (mdifferentiableAt_fst I I').mdifferentiableWithinAt #align mdifferentiable_within_at_fst mdifferentiableWithinAt_fst theorem mdifferentiable_fst : MDifferentiable (I.prod I') I (Prod.fst : M × M' → M) := fun _ => mdifferentiableAt_fst I I' #align mdifferentiable_fst mdifferentiable_fst theorem mdifferentiableOn_fst {s : Set (M × M')} : MDifferentiableOn (I.prod I') I Prod.fst s := (mdifferentiable_fst I I').mdifferentiableOn #align mdifferentiable_on_fst mdifferentiableOn_fst @[simp, mfld_simps] theorem mfderiv_fst {x : M × M'} : mfderiv (I.prod I') I Prod.fst x = ContinuousLinearMap.fst 𝕜 (TangentSpace I x.1) (TangentSpace I' x.2) := (hasMFDerivAt_fst I I' x).mfderiv #align mfderiv_fst mfderiv_fst theorem mfderivWithin_fst {s : Set (M × M')} {x : M × M'} (hxs : UniqueMDiffWithinAt (I.prod I') s x) : mfderivWithin (I.prod I') I Prod.fst s x = ContinuousLinearMap.fst 𝕜 (TangentSpace I x.1) (TangentSpace I' x.2) := by rw [MDifferentiable.mfderivWithin (mdifferentiableAt_fst I I') hxs]; exact mfderiv_fst I I' #align mfderiv_within_fst mfderivWithin_fst @[simp, mfld_simps] theorem tangentMap_prod_fst {p : TangentBundle (I.prod I') (M × M')} : tangentMap (I.prod I') I Prod.fst p = ⟨p.proj.1, p.2.1⟩ := by -- Porting note: `rfl` wasn't needed simp [tangentMap]; rfl #align tangent_map_prod_fst tangentMap_prod_fst theorem tangentMapWithin_prod_fst {s : Set (M × M')} {p : TangentBundle (I.prod I') (M × M')} (hs : UniqueMDiffWithinAt (I.prod I') s p.proj) : tangentMapWithin (I.prod I') I Prod.fst s p = ⟨p.proj.1, p.2.1⟩ := by simp only [tangentMapWithin] rw [mfderivWithin_fst] · rcases p with ⟨⟩; rfl · exact hs #align tangent_map_within_prod_fst tangentMapWithin_prod_fst theorem hasMFDerivAt_snd (x : M × M') : HasMFDerivAt (I.prod I') I' Prod.snd x (ContinuousLinearMap.snd 𝕜 (TangentSpace I x.1) (TangentSpace I' x.2)) := by refine ⟨continuous_snd.continuousAt, ?_⟩ have : ∀ᶠ y in 𝓝[range (I.prod I')] extChartAt (I.prod I') x x, (extChartAt I' x.2 ∘ Prod.snd ∘ (extChartAt (I.prod I') x).symm) y = y.2 := by filter_upwards [extChartAt_target_mem_nhdsWithin (I.prod I') x] with y hy rw [extChartAt_prod] at hy exact (extChartAt I' x.2).right_inv hy.2 apply HasFDerivWithinAt.congr_of_eventuallyEq hasFDerivWithinAt_snd this -- Porting note: the next line was `simp only [mfld_simps]` exact (extChartAt I' x.2).right_inv <\| (extChartAt I' x.2).map_source (mem_extChartAt_source _ _) #align has_mfderiv_at_snd hasMFDerivAt_snd theorem hasMFDerivWithinAt_snd (s : Set (M × M')) (x : M × M') : HasMFDerivWithinAt (I.prod I') I' Prod.snd s x (ContinuousLinearMap.snd 𝕜 (TangentSpace I x.1) (TangentSpace I' x.2)) := (hasMFDerivAt_snd I I' x).hasMFDerivWithinAt #align has_mfderiv_within_at_snd hasMFDerivWithinAt_snd theorem mdifferentiableAt_snd {x : M × M'} : MDifferentiableAt (I.prod I') I' Prod.snd x := (hasMFDerivAt_snd I I' x).mdifferentiableAt #align mdifferentiable_at_snd mdifferentiableAt_snd theorem mdifferentiableWithinAt_snd {s : Set (M × M')} {x : M × M'} : MDifferentiableWithinAt (I.prod I') I' Prod.snd s x := (mdifferentiableAt_snd I I').mdifferentiableWithinAt #align mdifferentiable_within_at_snd mdifferentiableWithinAt_snd theorem mdifferentiable_snd : MDifferentiable (I.prod I') I' (Prod.snd : M × M' → M') := fun _ => mdifferentiableAt_snd I I' #align mdifferentiable_snd mdifferentiable_snd theorem mdifferentiableOn_snd {s : Set (M × M')} : MDifferentiableOn (I.prod I') I' Prod.snd s := (mdifferentiable_snd I I').mdifferentiableOn #align mdifferentiable_on_snd mdifferentiableOn_snd @[simp, mfld_simps] theorem mfderiv_snd {x : M × M'} : mfderiv (I.prod I') I' Prod.snd x = ContinuousLinearMap.snd 𝕜 (TangentSpace I x.1) (TangentSpace I' x.2) := (hasMFDerivAt_snd I I' x).mfderiv #align mfderiv_snd mfderiv_snd theorem mfderivWithin_snd {s : Set (M × M')} {x : M × M'} (hxs : UniqueMDiffWithinAt (I.prod I') s x) : mfderivWithin (I.prod I') I' Prod.snd s x = ContinuousLinearMap.snd 𝕜 (TangentSpace I x.1) (TangentSpace I' x.2) := by rw [MDifferentiable.mfderivWithin (mdifferentiableAt_snd I I') hxs]; exact mfderiv_snd I I' #align mfderiv_within_snd mfderivWithin_snd @[simp, mfld_simps] theorem tangentMap_prod_snd {p : TangentBundle (I.prod I') (M × M')} : tangentMap (I.prod I') I' Prod.snd p = ⟨p.proj.2, p.2.2⟩ := by -- Porting note: `rfl` wasn't needed simp [tangentMap]; rfl #align tangent_map_prod_snd tangentMap_prod_snd theorem tangentMapWithin_prod_snd {s : Set (M × M')} {p : TangentBundle (I.prod I') (M × M')} (hs : UniqueMDiffWithinAt (I.prod I') s p.proj) : tangentMapWithin (I.prod I') I' Prod.snd s p = ⟨p.proj.2, p.2.2⟩ := by simp only [tangentMapWithin] rw [mfderivWithin_snd] · rcases p with ⟨⟩; rfl · exact hs #align tangent_map_within_prod_snd tangentMapWithin_prod_snd variable {I I' I''}	Mathlib/Geometry/Manifold/MFDeriv/SpecificFunctions.lean	374	381	theorem MDifferentiableAt.mfderiv_prod {f : M → M'} {g : M → M''} {x : M} (hf : MDifferentiableAt I I' f x) (hg : MDifferentiableAt I I'' g x) : mfderiv I (I'.prod I'') (fun x => (f x, g x)) x = (mfderiv I I' f x).prod (mfderiv I I'' g x) := by	classical simp_rw [mfderiv, if_pos (hf.prod_mk hg), if_pos hf, if_pos hg] exact hf.differentiableWithinAt_writtenInExtChartAt.fderivWithin_prod hg.differentiableWithinAt_writtenInExtChartAt (I.unique_diff _ (mem_range_self _))
import Mathlib.Algebra.Order.Kleene import Mathlib.Algebra.Ring.Hom.Defs import Mathlib.Data.List.Join import Mathlib.Data.Set.Lattice import Mathlib.Tactic.DeriveFintype #align_import computability.language from "leanprover-community/mathlib"@"a239cd3e7ac2c7cde36c913808f9d40c411344f6" open List Set Computability universe v variable {α β γ : Type} def Language (α) := Set (List α) #align language Language instance : Membership (List α) (Language α) := ⟨Set.Mem⟩ instance : Singleton (List α) (Language α) := ⟨Set.singleton⟩ instance : Insert (List α) (Language α) := ⟨Set.insert⟩ instance : CompleteAtomicBooleanAlgebra (Language α) := Set.completeAtomicBooleanAlgebra namespace Language variable {l m : Language α} {a b x : List α} -- Porting note: `reducible` attribute cannot be local. -- attribute [local reducible] Language instance : Zero (Language α) := ⟨(∅ : Set _)⟩ instance : One (Language α) := ⟨{[]}⟩ instance : Inhabited (Language α) := ⟨(∅ : Set _)⟩ instance : Add (Language α) := ⟨((· ∪ ·) : Set (List α) → Set (List α) → Set (List α))⟩ instance : Mul (Language α) := ⟨image2 (· ++ ·)⟩ theorem zero_def : (0 : Language α) = (∅ : Set _) := rfl #align language.zero_def Language.zero_def theorem one_def : (1 : Language α) = ({[]} : Set (List α)) := rfl #align language.one_def Language.one_def theorem add_def (l m : Language α) : l + m = (l ∪ m : Set (List α)) := rfl #align language.add_def Language.add_def theorem mul_def (l m : Language α) : l m = image2 (· ++ ·) l m := rfl #align language.mul_def Language.mul_def instance : KStar (Language α) := ⟨fun l ↦ {x \| ∃ L : List (List α), x = L.join ∧ ∀ y ∈ L, y ∈ l}⟩ lemma kstar_def (l : Language α) : l∗ = {x \| ∃ L : List (List α), x = L.join ∧ ∀ y ∈ L, y ∈ l} := rfl #align language.kstar_def Language.kstar_def -- Porting note: `reducible` attribute cannot be local, -- so this new theorem is required in place of `Set.ext`. @[ext] theorem ext {l m : Language α} (h : ∀ (x : List α), x ∈ l ↔ x ∈ m) : l = m := Set.ext h @[simp] theorem not_mem_zero (x : List α) : x ∉ (0 : Language α) := id #align language.not_mem_zero Language.not_mem_zero @[simp] theorem mem_one (x : List α) : x ∈ (1 : Language α) ↔ x = [] := by rfl #align language.mem_one Language.mem_one theorem nil_mem_one : [] ∈ (1 : Language α) := Set.mem_singleton _ #align language.nil_mem_one Language.nil_mem_one theorem mem_add (l m : Language α) (x : List α) : x ∈ l + m ↔ x ∈ l ∨ x ∈ m := Iff.rfl #align language.mem_add Language.mem_add theorem mem_mul : x ∈ l * m ↔ ∃ a ∈ l, ∃ b ∈ m, a ++ b = x := mem_image2 #align language.mem_mul Language.mem_mul theorem append_mem_mul : a ∈ l → b ∈ m → a ++ b ∈ l * m := mem_image2_of_mem #align language.append_mem_mul Language.append_mem_mul theorem mem_kstar : x ∈ l∗ ↔ ∃ L : List (List α), x = L.join ∧ ∀ y ∈ L, y ∈ l := Iff.rfl #align language.mem_kstar Language.mem_kstar theorem join_mem_kstar {L : List (List α)} (h : ∀ y ∈ L, y ∈ l) : L.join ∈ l∗ := ⟨L, rfl, h⟩ #align language.join_mem_kstar Language.join_mem_kstar theorem nil_mem_kstar (l : Language α) : [] ∈ l∗ := ⟨[], rfl, fun _ h ↦ by contradiction⟩ #align language.nil_mem_kstar Language.nil_mem_kstar instance instSemiring : Semiring (Language α) where add := (· + ·) add_assoc := union_assoc zero := 0 zero_add := empty_union add_zero := union_empty add_comm := union_comm mul := (· * ·) mul_assoc _ _ _ := image2_assoc append_assoc zero_mul _ := image2_empty_left mul_zero _ := image2_empty_right one := 1 one_mul l := by simp [mul_def, one_def] mul_one l := by simp [mul_def, one_def] natCast n := if n = 0 then 0 else 1 natCast_zero := rfl natCast_succ n := by cases n <;> simp [Nat.cast, add_def, zero_def] left_distrib _ _ _ := image2_union_right right_distrib _ _ _ := image2_union_left nsmul := nsmulRec @[simp] theorem add_self (l : Language α) : l + l = l := sup_idem _ #align language.add_self Language.add_self def map (f : α → β) : Language α →+* Language β where toFun := image (List.map f) map_zero' := image_empty _ map_one' := image_singleton map_add' := image_union _ map_mul' _ _ := image_image2_distrib <\| map_append _ #align language.map Language.map @[simp] theorem map_id (l : Language α) : map id l = l := by simp [map] #align language.map_id Language.map_id @[simp] theorem map_map (g : β → γ) (f : α → β) (l : Language α) : map g (map f l) = map (g ∘ f) l := by simp [map, image_image] #align language.map_map Language.map_map lemma mem_kstar_iff_exists_nonempty {x : List α} : x ∈ l∗ ↔ ∃ S : List (List α), x = S.join ∧ ∀ y ∈ S, y ∈ l ∧ y ≠ [] := by constructor · rintro ⟨S, rfl, h⟩ refine ⟨S.filter fun l ↦ !List.isEmpty l, by simp, fun y hy ↦ ?_⟩ -- Porting note: The previous code was: -- rw [mem_filter, empty_iff_eq_nil] at hy rw [mem_filter, Bool.not_eq_true', ← Bool.bool_iff_false, isEmpty_iff_eq_nil] at hy exact ⟨h y hy.1, hy.2⟩ · rintro ⟨S, hx, h⟩ exact ⟨S, hx, fun y hy ↦ (h y hy).1⟩ theorem kstar_def_nonempty (l : Language α) : l∗ = { x \| ∃ S : List (List α), x = S.join ∧ ∀ y ∈ S, y ∈ l ∧ y ≠ [] } := by ext x; apply mem_kstar_iff_exists_nonempty #align language.kstar_def_nonempty Language.kstar_def_nonempty theorem le_iff (l m : Language α) : l ≤ m ↔ l + m = m := sup_eq_right.symm #align language.le_iff Language.le_iff theorem le_mul_congr {l₁ l₂ m₁ m₂ : Language α} : l₁ ≤ m₁ → l₂ ≤ m₂ → l₁ * l₂ ≤ m₁ * m₂ := by intro h₁ h₂ x hx simp only [mul_def, exists_and_left, mem_image2, image_prod] at hx ⊢ tauto #align language.le_mul_congr Language.le_mul_congr theorem le_add_congr {l₁ l₂ m₁ m₂ : Language α} : l₁ ≤ m₁ → l₂ ≤ m₂ → l₁ + l₂ ≤ m₁ + m₂ := sup_le_sup #align language.le_add_congr Language.le_add_congr theorem mem_iSup {ι : Sort v} {l : ι → Language α} {x : List α} : (x ∈ ⨆ i, l i) ↔ ∃ i, x ∈ l i := mem_iUnion #align language.mem_supr Language.mem_iSup theorem iSup_mul {ι : Sort v} (l : ι → Language α) (m : Language α) : (⨆ i, l i) * m = ⨆ i, l i * m := image2_iUnion_left _ _ _ #align language.supr_mul Language.iSup_mul theorem mul_iSup {ι : Sort v} (l : ι → Language α) (m : Language α) : (m * ⨆ i, l i) = ⨆ i, m * l i := image2_iUnion_right _ _ _ #align language.mul_supr Language.mul_iSup theorem iSup_add {ι : Sort v} [Nonempty ι] (l : ι → Language α) (m : Language α) : (⨆ i, l i) + m = ⨆ i, l i + m := iSup_sup #align language.supr_add Language.iSup_add theorem add_iSup {ι : Sort v} [Nonempty ι] (l : ι → Language α) (m : Language α) : (m + ⨆ i, l i) = ⨆ i, m + l i := sup_iSup #align language.add_supr Language.add_iSup theorem mem_pow {l : Language α} {x : List α} {n : ℕ} : x ∈ l ^ n ↔ ∃ S : List (List α), x = S.join ∧ S.length = n ∧ ∀ y ∈ S, y ∈ l := by induction' n with n ihn generalizing x · simp only [mem_one, pow_zero, length_eq_zero] constructor · rintro rfl exact ⟨[], rfl, rfl, fun _ h ↦ by contradiction⟩ · rintro ⟨_, rfl, rfl, _⟩ rfl · simp only [pow_succ', mem_mul, ihn] constructor · rintro ⟨a, ha, b, ⟨S, rfl, rfl, hS⟩, rfl⟩ exact ⟨a :: S, rfl, rfl, forall_mem_cons.2 ⟨ha, hS⟩⟩ · rintro ⟨_ \| ⟨a, S⟩, rfl, hn, hS⟩ <;> cases hn rw [forall_mem_cons] at hS exact ⟨a, hS.1, _, ⟨S, rfl, rfl, hS.2⟩, rfl⟩ #align language.mem_pow Language.mem_pow theorem kstar_eq_iSup_pow (l : Language α) : l∗ = ⨆ i : ℕ, l ^ i := by ext x simp only [mem_kstar, mem_iSup, mem_pow] constructor · rintro ⟨S, rfl, hS⟩ exact ⟨_, S, rfl, rfl, hS⟩ · rintro ⟨_, S, rfl, rfl, hS⟩ exact ⟨S, rfl, hS⟩ #align language.kstar_eq_supr_pow Language.kstar_eq_iSup_pow @[simp] theorem map_kstar (f : α → β) (l : Language α) : map f l∗ = (map f l)∗ := by rw [kstar_eq_iSup_pow, kstar_eq_iSup_pow] simp_rw [← map_pow] exact image_iUnion #align language.map_kstar Language.map_kstar	Mathlib/Computability/Language.lean	269	270	theorem mul_self_kstar_comm (l : Language α) : l∗ * l = l * l∗ := by	simp only [kstar_eq_iSup_pow, mul_iSup, iSup_mul, ← pow_succ, ← pow_succ']
import Mathlib.Order.Filter.Partial import Mathlib.Topology.Basic #align_import topology.partial from "leanprover-community/mathlib"@"4c19a16e4b705bf135cf9a80ac18fcc99c438514" open Filter open Topology variable {X Y : Type*} [TopologicalSpace X] theorem rtendsto_nhds {r : Rel Y X} {l : Filter Y} {x : X} : RTendsto r l (𝓝 x) ↔ ∀ s, IsOpen s → x ∈ s → r.core s ∈ l := all_mem_nhds_filter _ _ (fun _s _t => id) _ #align rtendsto_nhds rtendsto_nhds theorem rtendsto'_nhds {r : Rel Y X} {l : Filter Y} {x : X} : RTendsto' r l (𝓝 x) ↔ ∀ s, IsOpen s → x ∈ s → r.preimage s ∈ l := by rw [rtendsto'_def] apply all_mem_nhds_filter apply Rel.preimage_mono #align rtendsto'_nhds rtendsto'_nhds theorem ptendsto_nhds {f : Y →. X} {l : Filter Y} {x : X} : PTendsto f l (𝓝 x) ↔ ∀ s, IsOpen s → x ∈ s → f.core s ∈ l := rtendsto_nhds #align ptendsto_nhds ptendsto_nhds theorem ptendsto'_nhds {f : Y →. X} {l : Filter Y} {x : X} : PTendsto' f l (𝓝 x) ↔ ∀ s, IsOpen s → x ∈ s → f.preimage s ∈ l := rtendsto'_nhds #align ptendsto'_nhds ptendsto'_nhds variable [TopologicalSpace Y] def PContinuous (f : X →. Y) := ∀ s, IsOpen s → IsOpen (f.preimage s) #align pcontinuous PContinuous	Mathlib/Topology/Partial.lean	57	58	theorem open_dom_of_pcontinuous {f : X →. Y} (h : PContinuous f) : IsOpen f.Dom := by	rw [← PFun.preimage_univ]; exact h _ isOpen_univ
import Mathlib.Algebra.Polynomial.AlgebraMap import Mathlib.Algebra.Polynomial.BigOperators import Mathlib.Algebra.Polynomial.Degree.Lemmas import Mathlib.Algebra.Polynomial.Div #align_import data.polynomial.ring_division from "leanprover-community/mathlib"@"8efcf8022aac8e01df8d302dcebdbc25d6a886c8" noncomputable section open Polynomial open Finset namespace Polynomial universe u v w z variable {R : Type u} {S : Type v} {T : Type w} {a b : R} {n : ℕ} section NoZeroDivisors variable [Semiring R] [NoZeroDivisors R] {p q : R[X]} instance : NoZeroDivisors R[X] where eq_zero_or_eq_zero_of_mul_eq_zero h := by rw [← leadingCoeff_eq_zero, ← leadingCoeff_eq_zero] refine eq_zero_or_eq_zero_of_mul_eq_zero ?_ rw [← leadingCoeff_zero, ← leadingCoeff_mul, h] theorem natDegree_mul (hp : p ≠ 0) (hq : q ≠ 0) : (pq).natDegree = p.natDegree + q.natDegree := by rw [← Nat.cast_inj (R := WithBot ℕ), ← degree_eq_natDegree (mul_ne_zero hp hq), Nat.cast_add, ← degree_eq_natDegree hp, ← degree_eq_natDegree hq, degree_mul] #align polynomial.nat_degree_mul Polynomial.natDegree_mul theorem trailingDegree_mul : (p q).trailingDegree = p.trailingDegree + q.trailingDegree := by by_cases hp : p = 0 · rw [hp, zero_mul, trailingDegree_zero, top_add] by_cases hq : q = 0 · rw [hq, mul_zero, trailingDegree_zero, add_top] · rw [trailingDegree_eq_natTrailingDegree hp, trailingDegree_eq_natTrailingDegree hq, trailingDegree_eq_natTrailingDegree (mul_ne_zero hp hq), natTrailingDegree_mul hp hq] apply WithTop.coe_add #align polynomial.trailing_degree_mul Polynomial.trailingDegree_mul @[simp] theorem natDegree_pow (p : R[X]) (n : ℕ) : natDegree (p ^ n) = n * natDegree p := by classical obtain rfl \| hp := eq_or_ne p 0 · obtain rfl \| hn := eq_or_ne n 0 <;> simp [] exact natDegree_pow' $ by rw [← leadingCoeff_pow, Ne, leadingCoeff_eq_zero]; exact pow_ne_zero _ hp #align polynomial.nat_degree_pow Polynomial.natDegree_pow theorem degree_le_mul_left (p : R[X]) (hq : q ≠ 0) : degree p ≤ degree (p q) := by classical exact if hp : p = 0 then by simp only [hp, zero_mul, le_refl] else by rw [degree_mul, degree_eq_natDegree hp, degree_eq_natDegree hq]; exact WithBot.coe_le_coe.2 (Nat.le_add_right _ _) #align polynomial.degree_le_mul_left Polynomial.degree_le_mul_left theorem natDegree_le_of_dvd {p q : R[X]} (h1 : p ∣ q) (h2 : q ≠ 0) : p.natDegree ≤ q.natDegree := by rcases h1 with ⟨q, rfl⟩; rw [mul_ne_zero_iff] at h2 rw [natDegree_mul h2.1 h2.2]; exact Nat.le_add_right _ _ #align polynomial.nat_degree_le_of_dvd Polynomial.natDegree_le_of_dvd theorem degree_le_of_dvd {p q : R[X]} (h1 : p ∣ q) (h2 : q ≠ 0) : degree p ≤ degree q := by rcases h1 with ⟨q, rfl⟩; rw [mul_ne_zero_iff] at h2 exact degree_le_mul_left p h2.2 #align polynomial.degree_le_of_dvd Polynomial.degree_le_of_dvd theorem eq_zero_of_dvd_of_degree_lt {p q : R[X]} (h₁ : p ∣ q) (h₂ : degree q < degree p) : q = 0 := by by_contra hc exact (lt_iff_not_ge _ _).mp h₂ (degree_le_of_dvd h₁ hc) #align polynomial.eq_zero_of_dvd_of_degree_lt Polynomial.eq_zero_of_dvd_of_degree_lt theorem eq_zero_of_dvd_of_natDegree_lt {p q : R[X]} (h₁ : p ∣ q) (h₂ : natDegree q < natDegree p) : q = 0 := by by_contra hc exact (lt_iff_not_ge _ _).mp h₂ (natDegree_le_of_dvd h₁ hc) #align polynomial.eq_zero_of_dvd_of_nat_degree_lt Polynomial.eq_zero_of_dvd_of_natDegree_lt theorem not_dvd_of_degree_lt {p q : R[X]} (h0 : q ≠ 0) (hl : q.degree < p.degree) : ¬p ∣ q := by by_contra hcontra exact h0 (eq_zero_of_dvd_of_degree_lt hcontra hl) #align polynomial.not_dvd_of_degree_lt Polynomial.not_dvd_of_degree_lt	Mathlib/Algebra/Polynomial/RingDivision.lean	183	186	theorem not_dvd_of_natDegree_lt {p q : R[X]} (h0 : q ≠ 0) (hl : q.natDegree < p.natDegree) : ¬p ∣ q := by	by_contra hcontra exact h0 (eq_zero_of_dvd_of_natDegree_lt hcontra hl)
import Mathlib.Data.Multiset.Dedup #align_import data.multiset.finset_ops from "leanprover-community/mathlib"@"c227d107bbada5d0d9d20287e3282c0a7f1651a0" namespace Multiset open List variable {α : Type*} [DecidableEq α] {s : Multiset α} def ndinsert (a : α) (s : Multiset α) : Multiset α := Quot.liftOn s (fun l => (l.insert a : Multiset α)) fun _ _ p => Quot.sound (p.insert a) #align multiset.ndinsert Multiset.ndinsert @[simp] theorem coe_ndinsert (a : α) (l : List α) : ndinsert a l = (insert a l : List α) := rfl #align multiset.coe_ndinsert Multiset.coe_ndinsert @[simp, nolint simpNF] -- Porting note (#10675): dsimp can not prove this theorem ndinsert_zero (a : α) : ndinsert a 0 = {a} := rfl #align multiset.ndinsert_zero Multiset.ndinsert_zero @[simp] theorem ndinsert_of_mem {a : α} {s : Multiset α} : a ∈ s → ndinsert a s = s := Quot.inductionOn s fun _ h => congr_arg ((↑) : List α → Multiset α) <\| insert_of_mem h #align multiset.ndinsert_of_mem Multiset.ndinsert_of_mem @[simp] theorem ndinsert_of_not_mem {a : α} {s : Multiset α} : a ∉ s → ndinsert a s = a ::ₘ s := Quot.inductionOn s fun _ h => congr_arg ((↑) : List α → Multiset α) <\| insert_of_not_mem h #align multiset.ndinsert_of_not_mem Multiset.ndinsert_of_not_mem @[simp] theorem mem_ndinsert {a b : α} {s : Multiset α} : a ∈ ndinsert b s ↔ a = b ∨ a ∈ s := Quot.inductionOn s fun _ => mem_insert_iff #align multiset.mem_ndinsert Multiset.mem_ndinsert @[simp] theorem le_ndinsert_self (a : α) (s : Multiset α) : s ≤ ndinsert a s := Quot.inductionOn s fun _ => (sublist_insert _ _).subperm #align multiset.le_ndinsert_self Multiset.le_ndinsert_self -- Porting note: removing @[simp], simp can prove it theorem mem_ndinsert_self (a : α) (s : Multiset α) : a ∈ ndinsert a s := mem_ndinsert.2 (Or.inl rfl) #align multiset.mem_ndinsert_self Multiset.mem_ndinsert_self theorem mem_ndinsert_of_mem {a b : α} {s : Multiset α} (h : a ∈ s) : a ∈ ndinsert b s := mem_ndinsert.2 (Or.inr h) #align multiset.mem_ndinsert_of_mem Multiset.mem_ndinsert_of_mem @[simp]	Mathlib/Data/Multiset/FinsetOps.lean	74	75	theorem length_ndinsert_of_mem {a : α} {s : Multiset α} (h : a ∈ s) : card (ndinsert a s) = card s := by	simp [h]
import Mathlib.Data.Set.Subsingleton import Mathlib.Logic.Equiv.Defs import Mathlib.Algebra.Group.Defs #align_import data.part from "leanprover-community/mathlib"@"80c43012d26f63026d362c3aba28f3c3bafb07e6" open Function structure Part.{u} (α : Type u) : Type u where Dom : Prop get : Dom → α #align part Part namespace Part variable {α : Type} {β : Type} {γ : Type} def toOption (o : Part α) [Decidable o.Dom] : Option α := if h : Dom o then some (o.get h) else none #align part.to_option Part.toOption @[simp] lemma toOption_isSome (o : Part α) [Decidable o.Dom] : o.toOption.isSome ↔ o.Dom := by by_cases h : o.Dom <;> simp [h, toOption] #align part.to_option_is_some Part.toOption_isSome @[simp] lemma toOption_isNone (o : Part α) [Decidable o.Dom] : o.toOption.isNone ↔ ¬o.Dom := by by_cases h : o.Dom <;> simp [h, toOption] #align part.to_option_is_none Part.toOption_isNone theorem ext' : ∀ {o p : Part α}, (o.Dom ↔ p.Dom) → (∀ h₁ h₂, o.get h₁ = p.get h₂) → o = p \| ⟨od, o⟩, ⟨pd, p⟩, H1, H2 => by have t : od = pd := propext H1 cases t; rw [show o = p from funext fun p => H2 p p] #align part.ext' Part.ext' @[simp] theorem eta : ∀ o : Part α, (⟨o.Dom, fun h => o.get h⟩ : Part α) = o \| ⟨_, _⟩ => rfl #align part.eta Part.eta protected def Mem (a : α) (o : Part α) : Prop := ∃ h, o.get h = a #align part.mem Part.Mem instance : Membership α (Part α) := ⟨Part.Mem⟩ theorem mem_eq (a : α) (o : Part α) : (a ∈ o) = ∃ h, o.get h = a := rfl #align part.mem_eq Part.mem_eq theorem dom_iff_mem : ∀ {o : Part α}, o.Dom ↔ ∃ y, y ∈ o \| ⟨_, f⟩ => ⟨fun h => ⟨f h, h, rfl⟩, fun ⟨_, h, rfl⟩ => h⟩ #align part.dom_iff_mem Part.dom_iff_mem theorem get_mem {o : Part α} (h) : get o h ∈ o := ⟨_, rfl⟩ #align part.get_mem Part.get_mem @[simp] theorem mem_mk_iff {p : Prop} {o : p → α} {a : α} : a ∈ Part.mk p o ↔ ∃ h, o h = a := Iff.rfl #align part.mem_mk_iff Part.mem_mk_iff @[ext] theorem ext {o p : Part α} (H : ∀ a, a ∈ o ↔ a ∈ p) : o = p := (ext' ⟨fun h => ((H _).1 ⟨h, rfl⟩).fst, fun h => ((H _).2 ⟨h, rfl⟩).fst⟩) fun _ _ => ((H _).2 ⟨_, rfl⟩).snd #align part.ext Part.ext def none : Part α := ⟨False, False.rec⟩ #align part.none Part.none instance : Inhabited (Part α) := ⟨none⟩ @[simp] theorem not_mem_none (a : α) : a ∉ @none α := fun h => h.fst #align part.not_mem_none Part.not_mem_none def some (a : α) : Part α := ⟨True, fun _ => a⟩ #align part.some Part.some @[simp] theorem some_dom (a : α) : (some a).Dom := trivial #align part.some_dom Part.some_dom theorem mem_unique : ∀ {a b : α} {o : Part α}, a ∈ o → b ∈ o → a = b \| _, _, ⟨_, _⟩, ⟨_, rfl⟩, ⟨_, rfl⟩ => rfl #align part.mem_unique Part.mem_unique theorem Mem.left_unique : Relator.LeftUnique ((· ∈ ·) : α → Part α → Prop) := fun _ _ _ => mem_unique #align part.mem.left_unique Part.Mem.left_unique theorem get_eq_of_mem {o : Part α} {a} (h : a ∈ o) (h') : get o h' = a := mem_unique ⟨_, rfl⟩ h #align part.get_eq_of_mem Part.get_eq_of_mem protected theorem subsingleton (o : Part α) : Set.Subsingleton { a \| a ∈ o } := fun _ ha _ hb => mem_unique ha hb #align part.subsingleton Part.subsingleton @[simp] theorem get_some {a : α} (ha : (some a).Dom) : get (some a) ha = a := rfl #align part.get_some Part.get_some theorem mem_some (a : α) : a ∈ some a := ⟨trivial, rfl⟩ #align part.mem_some Part.mem_some @[simp] theorem mem_some_iff {a b} : b ∈ (some a : Part α) ↔ b = a := ⟨fun ⟨_, e⟩ => e.symm, fun e => ⟨trivial, e.symm⟩⟩ #align part.mem_some_iff Part.mem_some_iff theorem eq_some_iff {a : α} {o : Part α} : o = some a ↔ a ∈ o := ⟨fun e => e.symm ▸ mem_some _, fun ⟨h, e⟩ => e ▸ ext' (iff_true_intro h) fun _ _ => rfl⟩ #align part.eq_some_iff Part.eq_some_iff theorem eq_none_iff {o : Part α} : o = none ↔ ∀ a, a ∉ o := ⟨fun e => e.symm ▸ not_mem_none, fun h => ext (by simpa)⟩ #align part.eq_none_iff Part.eq_none_iff theorem eq_none_iff' {o : Part α} : o = none ↔ ¬o.Dom := ⟨fun e => e.symm ▸ id, fun h => eq_none_iff.2 fun _ h' => h h'.fst⟩ #align part.eq_none_iff' Part.eq_none_iff' @[simp] theorem not_none_dom : ¬(none : Part α).Dom := id #align part.not_none_dom Part.not_none_dom @[simp] theorem some_ne_none (x : α) : some x ≠ none := by intro h exact true_ne_false (congr_arg Dom h) #align part.some_ne_none Part.some_ne_none @[simp] theorem none_ne_some (x : α) : none ≠ some x := (some_ne_none x).symm #align part.none_ne_some Part.none_ne_some theorem ne_none_iff {o : Part α} : o ≠ none ↔ ∃ x, o = some x := by constructor · rw [Ne, eq_none_iff', not_not] exact fun h => ⟨o.get h, eq_some_iff.2 (get_mem h)⟩ · rintro ⟨x, rfl⟩ apply some_ne_none #align part.ne_none_iff Part.ne_none_iff theorem eq_none_or_eq_some (o : Part α) : o = none ∨ ∃ x, o = some x := or_iff_not_imp_left.2 ne_none_iff.1 #align part.eq_none_or_eq_some Part.eq_none_or_eq_some theorem some_injective : Injective (@Part.some α) := fun _ _ h => congr_fun (eq_of_heq (Part.mk.inj h).2) trivial #align part.some_injective Part.some_injective @[simp] theorem some_inj {a b : α} : Part.some a = some b ↔ a = b := some_injective.eq_iff #align part.some_inj Part.some_inj @[simp] theorem some_get {a : Part α} (ha : a.Dom) : Part.some (Part.get a ha) = a := Eq.symm (eq_some_iff.2 ⟨ha, rfl⟩) #align part.some_get Part.some_get theorem get_eq_iff_eq_some {a : Part α} {ha : a.Dom} {b : α} : a.get ha = b ↔ a = some b := ⟨fun h => by simp [h.symm], fun h => by simp [h]⟩ #align part.get_eq_iff_eq_some Part.get_eq_iff_eq_some theorem get_eq_get_of_eq (a : Part α) (ha : a.Dom) {b : Part α} (h : a = b) : a.get ha = b.get (h ▸ ha) := by congr #align part.get_eq_get_of_eq Part.get_eq_get_of_eq theorem get_eq_iff_mem {o : Part α} {a : α} (h : o.Dom) : o.get h = a ↔ a ∈ o := ⟨fun H => ⟨h, H⟩, fun ⟨_, H⟩ => H⟩ #align part.get_eq_iff_mem Part.get_eq_iff_mem theorem eq_get_iff_mem {o : Part α} {a : α} (h : o.Dom) : a = o.get h ↔ a ∈ o := eq_comm.trans (get_eq_iff_mem h) #align part.eq_get_iff_mem Part.eq_get_iff_mem @[simp] theorem none_toOption [Decidable (@none α).Dom] : (none : Part α).toOption = Option.none := dif_neg id #align part.none_to_option Part.none_toOption @[simp] theorem some_toOption (a : α) [Decidable (some a).Dom] : (some a).toOption = Option.some a := dif_pos trivial #align part.some_to_option Part.some_toOption instance noneDecidable : Decidable (@none α).Dom := instDecidableFalse #align part.none_decidable Part.noneDecidable instance someDecidable (a : α) : Decidable (some a).Dom := instDecidableTrue #align part.some_decidable Part.someDecidable def getOrElse (a : Part α) [Decidable a.Dom] (d : α) := if ha : a.Dom then a.get ha else d #align part.get_or_else Part.getOrElse theorem getOrElse_of_dom (a : Part α) (h : a.Dom) [Decidable a.Dom] (d : α) : getOrElse a d = a.get h := dif_pos h #align part.get_or_else_of_dom Part.getOrElse_of_dom theorem getOrElse_of_not_dom (a : Part α) (h : ¬a.Dom) [Decidable a.Dom] (d : α) : getOrElse a d = d := dif_neg h #align part.get_or_else_of_not_dom Part.getOrElse_of_not_dom @[simp] theorem getOrElse_none (d : α) [Decidable (none : Part α).Dom] : getOrElse none d = d := none.getOrElse_of_not_dom not_none_dom d #align part.get_or_else_none Part.getOrElse_none @[simp] theorem getOrElse_some (a : α) (d : α) [Decidable (some a).Dom] : getOrElse (some a) d = a := (some a).getOrElse_of_dom (some_dom a) d #align part.get_or_else_some Part.getOrElse_some -- Porting note: removed `simp` theorem mem_toOption {o : Part α} [Decidable o.Dom] {a : α} : a ∈ toOption o ↔ a ∈ o := by unfold toOption by_cases h : o.Dom <;> simp [h] · exact ⟨fun h => ⟨_, h⟩, fun ⟨_, h⟩ => h⟩ · exact mt Exists.fst h #align part.mem_to_option Part.mem_toOption -- Porting note (#10756): new theorem, like `mem_toOption` but with LHS in `simp` normal form @[simp] theorem toOption_eq_some_iff {o : Part α} [Decidable o.Dom] {a : α} : toOption o = Option.some a ↔ a ∈ o := by rw [← Option.mem_def, mem_toOption] protected theorem Dom.toOption {o : Part α} [Decidable o.Dom] (h : o.Dom) : o.toOption = o.get h := dif_pos h #align part.dom.to_option Part.Dom.toOption theorem toOption_eq_none_iff {a : Part α} [Decidable a.Dom] : a.toOption = Option.none ↔ ¬a.Dom := Ne.dite_eq_right_iff fun _ => Option.some_ne_none _ #align part.to_option_eq_none_iff Part.toOption_eq_none_iff theorem elim_toOption {α β : Type} (a : Part α) [Decidable a.Dom] (b : β) (f : α → β) : a.toOption.elim b f = if h : a.Dom then f (a.get h) else b := by split_ifs with h · rw [h.toOption] rfl · rw [Part.toOption_eq_none_iff.2 h] rfl #align part.elim_to_option Part.elim_toOption @[coe] def ofOption : Option α → Part α \| Option.none => none \| Option.some a => some a #align part.of_option Part.ofOption @[simp] theorem mem_ofOption {a : α} : ∀ {o : Option α}, a ∈ ofOption o ↔ a ∈ o \| Option.none => ⟨fun h => h.fst.elim, fun h => Option.noConfusion h⟩ \| Option.some _ => ⟨fun h => congr_arg Option.some h.snd, fun h => ⟨trivial, Option.some.inj h⟩⟩ #align part.mem_of_option Part.mem_ofOption @[simp] theorem ofOption_dom {α} : ∀ o : Option α, (ofOption o).Dom ↔ o.isSome \| Option.none => by simp [ofOption, none] \| Option.some a => by simp [ofOption] #align part.of_option_dom Part.ofOption_dom theorem ofOption_eq_get {α} (o : Option α) : ofOption o = ⟨_, @Option.get _ o⟩ := Part.ext' (ofOption_dom o) fun h₁ h₂ => by cases o · simp at h₂ · rfl #align part.of_option_eq_get Part.ofOption_eq_get instance : Coe (Option α) (Part α) := ⟨ofOption⟩ theorem mem_coe {a : α} {o : Option α} : a ∈ (o : Part α) ↔ a ∈ o := mem_ofOption #align part.mem_coe Part.mem_coe @[simp] theorem coe_none : (@Option.none α : Part α) = none := rfl #align part.coe_none Part.coe_none @[simp] theorem coe_some (a : α) : (Option.some a : Part α) = some a := rfl #align part.coe_some Part.coe_some @[elab_as_elim] protected theorem induction_on {P : Part α → Prop} (a : Part α) (hnone : P none) (hsome : ∀ a : α, P (some a)) : P a := (Classical.em a.Dom).elim (fun h => Part.some_get h ▸ hsome _) fun h => (eq_none_iff'.2 h).symm ▸ hnone #align part.induction_on Part.induction_on instance ofOptionDecidable : ∀ o : Option α, Decidable (ofOption o).Dom \| Option.none => Part.noneDecidable \| Option.some a => Part.someDecidable a #align part.of_option_decidable Part.ofOptionDecidable @[simp] theorem to_ofOption (o : Option α) : toOption (ofOption o) = o := by cases o <;> rfl #align part.to_of_option Part.to_ofOption @[simp] theorem of_toOption (o : Part α) [Decidable o.Dom] : ofOption (toOption o) = o := ext fun _ => mem_ofOption.trans mem_toOption #align part.of_to_option Part.of_toOption noncomputable def equivOption : Part α ≃ Option α := haveI := Classical.dec ⟨fun o => toOption o, ofOption, fun o => of_toOption o, fun o => Eq.trans (by dsimp; congr) (to_ofOption o)⟩ #align part.equiv_option Part.equivOption instance : PartialOrder (Part α) where le x y := ∀ i, i ∈ x → i ∈ y le_refl x y := id le_trans x y z f g i := g _ ∘ f _ le_antisymm x y f g := Part.ext fun z => ⟨f _, g _⟩ instance : OrderBot (Part α) where bot := none bot_le := by rintro x _ ⟨⟨_⟩, _⟩ theorem le_total_of_le_of_le {x y : Part α} (z : Part α) (hx : x ≤ z) (hy : y ≤ z) : x ≤ y ∨ y ≤ x := by rcases Part.eq_none_or_eq_some x with (h \| ⟨b, h₀⟩) · rw [h] left apply OrderBot.bot_le _ right; intro b' h₁ rw [Part.eq_some_iff] at h₀ have hx := hx _ h₀; have hy := hy _ h₁ have hx := Part.mem_unique hx hy; subst hx exact h₀ #align part.le_total_of_le_of_le Part.le_total_of_le_of_le def assert (p : Prop) (f : p → Part α) : Part α := ⟨∃ h : p, (f h).Dom, fun ha => (f ha.fst).get ha.snd⟩ #align part.assert Part.assert protected def bind (f : Part α) (g : α → Part β) : Part β := assert (Dom f) fun b => g (f.get b) #align part.bind Part.bind @[simps] def map (f : α → β) (o : Part α) : Part β := ⟨o.Dom, f ∘ o.get⟩ #align part.map Part.map #align part.map_dom Part.map_Dom #align part.map_get Part.map_get theorem mem_map (f : α → β) {o : Part α} : ∀ {a}, a ∈ o → f a ∈ map f o \| _, ⟨_, rfl⟩ => ⟨_, rfl⟩ #align part.mem_map Part.mem_map @[simp] theorem mem_map_iff (f : α → β) {o : Part α} {b} : b ∈ map f o ↔ ∃ a ∈ o, f a = b := ⟨fun hb => match b, hb with \| _, ⟨_, rfl⟩ => ⟨_, ⟨_, rfl⟩, rfl⟩, fun ⟨_, h₁, h₂⟩ => h₂ ▸ mem_map f h₁⟩ #align part.mem_map_iff Part.mem_map_iff @[simp] theorem map_none (f : α → β) : map f none = none := eq_none_iff.2 fun a => by simp #align part.map_none Part.map_none @[simp] theorem map_some (f : α → β) (a : α) : map f (some a) = some (f a) := eq_some_iff.2 <\| mem_map f <\| mem_some _ #align part.map_some Part.map_some theorem mem_assert {p : Prop} {f : p → Part α} : ∀ {a} (h : p), a ∈ f h → a ∈ assert p f \| _, x, ⟨h, rfl⟩ => ⟨⟨x, h⟩, rfl⟩ #align part.mem_assert Part.mem_assert @[simp] theorem mem_assert_iff {p : Prop} {f : p → Part α} {a} : a ∈ assert p f ↔ ∃ h : p, a ∈ f h := ⟨fun ha => match a, ha with \| _, ⟨_, rfl⟩ => ⟨_, ⟨_, rfl⟩⟩, fun ⟨_, h⟩ => mem_assert _ h⟩ #align part.mem_assert_iff Part.mem_assert_iff theorem assert_pos {p : Prop} {f : p → Part α} (h : p) : assert p f = f h := by dsimp [assert] cases h' : f h simp only [h', mk.injEq, h, exists_prop_of_true, true_and] apply Function.hfunext · simp only [h, h', exists_prop_of_true] · aesop #align part.assert_pos Part.assert_pos theorem assert_neg {p : Prop} {f : p → Part α} (h : ¬p) : assert p f = none := by dsimp [assert, none]; congr · simp only [h, not_false_iff, exists_prop_of_false] · apply Function.hfunext · simp only [h, not_false_iff, exists_prop_of_false] simp at * #align part.assert_neg Part.assert_neg theorem mem_bind {f : Part α} {g : α → Part β} : ∀ {a b}, a ∈ f → b ∈ g a → b ∈ f.bind g \| _, _, ⟨h, rfl⟩, ⟨h₂, rfl⟩ => ⟨⟨h, h₂⟩, rfl⟩ #align part.mem_bind Part.mem_bind @[simp] theorem mem_bind_iff {f : Part α} {g : α → Part β} {b} : b ∈ f.bind g ↔ ∃ a ∈ f, b ∈ g a := ⟨fun hb => match b, hb with \| _, ⟨⟨_, _⟩, rfl⟩ => ⟨_, ⟨_, rfl⟩, ⟨_, rfl⟩⟩, fun ⟨_, h₁, h₂⟩ => mem_bind h₁ h₂⟩ #align part.mem_bind_iff Part.mem_bind_iff protected theorem Dom.bind {o : Part α} (h : o.Dom) (f : α → Part β) : o.bind f = f (o.get h) := by ext b simp only [Part.mem_bind_iff, exists_prop] refine ⟨?_, fun hb => ⟨o.get h, Part.get_mem _, hb⟩⟩ rintro ⟨a, ha, hb⟩ rwa [Part.get_eq_of_mem ha] #align part.dom.bind Part.Dom.bind theorem Dom.of_bind {f : α → Part β} {a : Part α} (h : (a.bind f).Dom) : a.Dom := h.1 #align part.dom.of_bind Part.Dom.of_bind @[simp] theorem bind_none (f : α → Part β) : none.bind f = none := eq_none_iff.2 fun a => by simp #align part.bind_none Part.bind_none @[simp] theorem bind_some (a : α) (f : α → Part β) : (some a).bind f = f a := ext <\| by simp #align part.bind_some Part.bind_some theorem bind_of_mem {o : Part α} {a : α} (h : a ∈ o) (f : α → Part β) : o.bind f = f a := by rw [eq_some_iff.2 h, bind_some] #align part.bind_of_mem Part.bind_of_mem theorem bind_some_eq_map (f : α → β) (x : Part α) : x.bind (some ∘ f) = map f x := ext <\| by simp [eq_comm] #align part.bind_some_eq_map Part.bind_some_eq_map theorem bind_toOption (f : α → Part β) (o : Part α) [Decidable o.Dom] [∀ a, Decidable (f a).Dom] [Decidable (o.bind f).Dom] : (o.bind f).toOption = o.toOption.elim Option.none fun a => (f a).toOption := by by_cases h : o.Dom · simp_rw [h.toOption, h.bind] rfl · rw [Part.toOption_eq_none_iff.2 h] exact Part.toOption_eq_none_iff.2 fun ho => h ho.of_bind #align part.bind_to_option Part.bind_toOption theorem bind_assoc {γ} (f : Part α) (g : α → Part β) (k : β → Part γ) : (f.bind g).bind k = f.bind fun x => (g x).bind k := ext fun a => by simp only [mem_bind_iff] exact ⟨fun ⟨_, ⟨_, h₁, h₂⟩, h₃⟩ => ⟨_, h₁, _, h₂, h₃⟩, fun ⟨_, h₁, _, h₂, h₃⟩ => ⟨_, ⟨_, h₁, h₂⟩, h₃⟩⟩ #align part.bind_assoc Part.bind_assoc @[simp] theorem bind_map {γ} (f : α → β) (x) (g : β → Part γ) : (map f x).bind g = x.bind fun y => g (f y) := by rw [← bind_some_eq_map, bind_assoc]; simp #align part.bind_map Part.bind_map @[simp] theorem map_bind {γ} (f : α → Part β) (x : Part α) (g : β → γ) : map g (x.bind f) = x.bind fun y => map g (f y) := by rw [← bind_some_eq_map, bind_assoc]; simp [bind_some_eq_map] #align part.map_bind Part.map_bind theorem map_map (g : β → γ) (f : α → β) (o : Part α) : map g (map f o) = map (g ∘ f) o := by erw [← bind_some_eq_map, bind_map, bind_some_eq_map] #align part.map_map Part.map_map instance : Monad Part where pure := @some map := @map bind := @Part.bind instance : LawfulMonad Part where bind_pure_comp := @bind_some_eq_map id_map f := by cases f; rfl pure_bind := @bind_some bind_assoc := @bind_assoc map_const := by simp [Functor.mapConst, Functor.map] --Porting TODO : In Lean3 these were automatic by a tactic seqLeft_eq x y := ext' (by simp [SeqLeft.seqLeft, Part.bind, assert, Seq.seq, const, (· <$> ·), and_comm]) (fun _ _ => rfl) seqRight_eq x y := ext' (by simp [SeqRight.seqRight, Part.bind, assert, Seq.seq, const, (· <$> ·), and_comm]) (fun _ _ => rfl) pure_seq x y := ext' (by simp [Seq.seq, Part.bind, assert, (· <$> ·), pure]) (fun _ _ => rfl) bind_map x y := ext' (by simp [(· >>= ·), Part.bind, assert, Seq.seq, get, (· <$> ·)] ) (fun _ _ => rfl) theorem map_id' {f : α → α} (H : ∀ x : α, f x = x) (o) : map f o = o := by rw [show f = id from funext H]; exact id_map o #align part.map_id' Part.map_id' @[simp] theorem bind_some_right (x : Part α) : x.bind some = x := by erw [bind_some_eq_map]; simp [map_id'] #align part.bind_some_right Part.bind_some_right @[simp] theorem pure_eq_some (a : α) : pure a = some a := rfl #align part.pure_eq_some Part.pure_eq_some @[simp] theorem ret_eq_some (a : α) : (return a : Part α) = some a := rfl #align part.ret_eq_some Part.ret_eq_some @[simp] theorem map_eq_map {α β} (f : α → β) (o : Part α) : f <$> o = map f o := rfl #align part.map_eq_map Part.map_eq_map @[simp] theorem bind_eq_bind {α β} (f : Part α) (g : α → Part β) : f >>= g = f.bind g := rfl #align part.bind_eq_bind Part.bind_eq_bind theorem bind_le {α} (x : Part α) (f : α → Part β) (y : Part β) : x >>= f ≤ y ↔ ∀ a, a ∈ x → f a ≤ y := by constructor <;> intro h · intro a h' b have h := h b simp only [and_imp, exists_prop, bind_eq_bind, mem_bind_iff, exists_imp] at h apply h _ h' · intro b h' simp only [exists_prop, bind_eq_bind, mem_bind_iff] at h' rcases h' with ⟨a, h₀, h₁⟩ apply h _ h₀ _ h₁ #align part.bind_le Part.bind_le -- Porting note: No MonadFail in Lean4 yet -- instance : MonadFail Part := -- { Part.monad with fail := fun _ _ => none } def restrict (p : Prop) (o : Part α) (H : p → o.Dom) : Part α := ⟨p, fun h => o.get (H h)⟩ #align part.restrict Part.restrict @[simp] theorem mem_restrict (p : Prop) (o : Part α) (h : p → o.Dom) (a : α) : a ∈ restrict p o h ↔ p ∧ a ∈ o := by dsimp [restrict, mem_eq]; constructor · rintro ⟨h₀, h₁⟩ exact ⟨h₀, ⟨_, h₁⟩⟩ rintro ⟨h₀, _, h₂⟩; exact ⟨h₀, h₂⟩ #align part.mem_restrict Part.mem_restrict unsafe def unwrap (o : Part α) : α := o.get lcProof #align part.unwrap Part.unwrap theorem assert_defined {p : Prop} {f : p → Part α} : ∀ h : p, (f h).Dom → (assert p f).Dom := Exists.intro #align part.assert_defined Part.assert_defined theorem bind_defined {f : Part α} {g : α → Part β} : ∀ h : f.Dom, (g (f.get h)).Dom → (f.bind g).Dom := assert_defined #align part.bind_defined Part.bind_defined @[simp] theorem bind_dom {f : Part α} {g : α → Part β} : (f.bind g).Dom ↔ ∃ h : f.Dom, (g (f.get h)).Dom := Iff.rfl #align part.bind_dom Part.bind_dom section Instances @[to_additive] instance [One α] : One (Part α) where one := pure 1 @[to_additive] instance [Mul α] : Mul (Part α) where mul a b := (· * ·) <$> a <> b @[to_additive] instance [Inv α] : Inv (Part α) where inv := map Inv.inv @[to_additive] instance [Div α] : Div (Part α) where div a b := (· / ·) <$> a <> b instance [Mod α] : Mod (Part α) where mod a b := (· % ·) <$> a <> b instance [Append α] : Append (Part α) where append a b := (· ++ ·) <$> a <> b instance [Inter α] : Inter (Part α) where inter a b := (· ∩ ·) <$> a <> b instance [Union α] : Union (Part α) where union a b := (· ∪ ·) <$> a <> b instance [SDiff α] : SDiff (Part α) where sdiff a b := (· \ ·) <$> a <> b section -- Porting note (#10756): new theorems to unfold definitions theorem mul_def [Mul α] (a b : Part α) : a b = bind a fun y ↦ map (y * ·) b := rfl theorem one_def [One α] : (1 : Part α) = some 1 := rfl theorem inv_def [Inv α] (a : Part α) : a⁻¹ = Part.map (· ⁻¹) a := rfl theorem div_def [Div α] (a b : Part α) : a / b = bind a fun y => map (y / ·) b := rfl theorem mod_def [Mod α] (a b : Part α) : a % b = bind a fun y => map (y % ·) b := rfl theorem append_def [Append α] (a b : Part α) : a ++ b = bind a fun y => map (y ++ ·) b := rfl theorem inter_def [Inter α] (a b : Part α) : a ∩ b = bind a fun y => map (y ∩ ·) b := rfl theorem union_def [Union α] (a b : Part α) : a ∪ b = bind a fun y => map (y ∪ ·) b := rfl theorem sdiff_def [SDiff α] (a b : Part α) : a \ b = bind a fun y => map (y \ ·) b := rfl end @[to_additive] theorem one_mem_one [One α] : (1 : α) ∈ (1 : Part α) := ⟨trivial, rfl⟩ #align part.one_mem_one Part.one_mem_one #align part.zero_mem_zero Part.zero_mem_zero @[to_additive] theorem mul_mem_mul [Mul α] (a b : Part α) (ma mb : α) (ha : ma ∈ a) (hb : mb ∈ b) : ma * mb ∈ a * b := ⟨⟨ha.1, hb.1⟩, by simp only [← ha.2, ← hb.2]; rfl⟩ #align part.mul_mem_mul Part.mul_mem_mul #align part.add_mem_add Part.add_mem_add @[to_additive] theorem left_dom_of_mul_dom [Mul α] {a b : Part α} (hab : Dom (a * b)) : a.Dom := hab.1 #align part.left_dom_of_mul_dom Part.left_dom_of_mul_dom #align part.left_dom_of_add_dom Part.left_dom_of_add_dom @[to_additive] theorem right_dom_of_mul_dom [Mul α] {a b : Part α} (hab : Dom (a * b)) : b.Dom := hab.2 #align part.right_dom_of_mul_dom Part.right_dom_of_mul_dom #align part.right_dom_of_add_dom Part.right_dom_of_add_dom @[to_additive (attr := simp)] theorem mul_get_eq [Mul α] (a b : Part α) (hab : Dom (a * b)) : (a * b).get hab = a.get (left_dom_of_mul_dom hab) * b.get (right_dom_of_mul_dom hab) := rfl #align part.mul_get_eq Part.mul_get_eq #align part.add_get_eq Part.add_get_eq @[to_additive] theorem some_mul_some [Mul α] (a b : α) : some a * some b = some (a * b) := by simp [mul_def] #align part.some_mul_some Part.some_mul_some #align part.some_add_some Part.some_add_some @[to_additive] theorem inv_mem_inv [Inv α] (a : Part α) (ma : α) (ha : ma ∈ a) : ma⁻¹ ∈ a⁻¹ := by simp [inv_def]; aesop #align part.inv_mem_inv Part.inv_mem_inv #align part.neg_mem_neg Part.neg_mem_neg @[to_additive] theorem inv_some [Inv α] (a : α) : (some a)⁻¹ = some a⁻¹ := rfl #align part.inv_some Part.inv_some #align part.neg_some Part.neg_some @[to_additive] theorem div_mem_div [Div α] (a b : Part α) (ma mb : α) (ha : ma ∈ a) (hb : mb ∈ b) : ma / mb ∈ a / b := by simp [div_def]; aesop #align part.div_mem_div Part.div_mem_div #align part.sub_mem_sub Part.sub_mem_sub @[to_additive] theorem left_dom_of_div_dom [Div α] {a b : Part α} (hab : Dom (a / b)) : a.Dom := hab.1 #align part.left_dom_of_div_dom Part.left_dom_of_div_dom #align part.left_dom_of_sub_dom Part.left_dom_of_sub_dom @[to_additive] theorem right_dom_of_div_dom [Div α] {a b : Part α} (hab : Dom (a / b)) : b.Dom := hab.2 #align part.right_dom_of_div_dom Part.right_dom_of_div_dom #align part.right_dom_of_sub_dom Part.right_dom_of_sub_dom @[to_additive (attr := simp)] theorem div_get_eq [Div α] (a b : Part α) (hab : Dom (a / b)) : (a / b).get hab = a.get (left_dom_of_div_dom hab) / b.get (right_dom_of_div_dom hab) := by simp [div_def]; aesop #align part.div_get_eq Part.div_get_eq #align part.sub_get_eq Part.sub_get_eq @[to_additive] theorem some_div_some [Div α] (a b : α) : some a / some b = some (a / b) := by simp [div_def] #align part.some_div_some Part.some_div_some #align part.some_sub_some Part.some_sub_some theorem mod_mem_mod [Mod α] (a b : Part α) (ma mb : α) (ha : ma ∈ a) (hb : mb ∈ b) : ma % mb ∈ a % b := by simp [mod_def]; aesop #align part.mod_mem_mod Part.mod_mem_mod theorem left_dom_of_mod_dom [Mod α] {a b : Part α} (hab : Dom (a % b)) : a.Dom := hab.1 #align part.left_dom_of_mod_dom Part.left_dom_of_mod_dom theorem right_dom_of_mod_dom [Mod α] {a b : Part α} (hab : Dom (a % b)) : b.Dom := hab.2 #align part.right_dom_of_mod_dom Part.right_dom_of_mod_dom @[simp] theorem mod_get_eq [Mod α] (a b : Part α) (hab : Dom (a % b)) : (a % b).get hab = a.get (left_dom_of_mod_dom hab) % b.get (right_dom_of_mod_dom hab) := by simp [mod_def]; aesop #align part.mod_get_eq Part.mod_get_eq theorem some_mod_some [Mod α] (a b : α) : some a % some b = some (a % b) := by simp [mod_def] #align part.some_mod_some Part.some_mod_some theorem append_mem_append [Append α] (a b : Part α) (ma mb : α) (ha : ma ∈ a) (hb : mb ∈ b) : ma ++ mb ∈ a ++ b := by simp [append_def]; aesop #align part.append_mem_append Part.append_mem_append theorem left_dom_of_append_dom [Append α] {a b : Part α} (hab : Dom (a ++ b)) : a.Dom := hab.1 #align part.left_dom_of_append_dom Part.left_dom_of_append_dom theorem right_dom_of_append_dom [Append α] {a b : Part α} (hab : Dom (a ++ b)) : b.Dom := hab.2 #align part.right_dom_of_append_dom Part.right_dom_of_append_dom @[simp] theorem append_get_eq [Append α] (a b : Part α) (hab : Dom (a ++ b)) : (a ++ b).get hab = a.get (left_dom_of_append_dom hab) ++ b.get (right_dom_of_append_dom hab) := by simp [append_def]; aesop #align part.append_get_eq Part.append_get_eq theorem some_append_some [Append α] (a b : α) : some a ++ some b = some (a ++ b) := by simp [append_def] #align part.some_append_some Part.some_append_some theorem inter_mem_inter [Inter α] (a b : Part α) (ma mb : α) (ha : ma ∈ a) (hb : mb ∈ b) : ma ∩ mb ∈ a ∩ b := by simp [inter_def]; aesop #align part.inter_mem_inter Part.inter_mem_inter theorem left_dom_of_inter_dom [Inter α] {a b : Part α} (hab : Dom (a ∩ b)) : a.Dom := hab.1 #align part.left_dom_of_inter_dom Part.left_dom_of_inter_dom theorem right_dom_of_inter_dom [Inter α] {a b : Part α} (hab : Dom (a ∩ b)) : b.Dom := hab.2 #align part.right_dom_of_inter_dom Part.right_dom_of_inter_dom @[simp] theorem inter_get_eq [Inter α] (a b : Part α) (hab : Dom (a ∩ b)) : (a ∩ b).get hab = a.get (left_dom_of_inter_dom hab) ∩ b.get (right_dom_of_inter_dom hab) := by simp [inter_def]; aesop #align part.inter_get_eq Part.inter_get_eq theorem some_inter_some [Inter α] (a b : α) : some a ∩ some b = some (a ∩ b) := by simp [inter_def] #align part.some_inter_some Part.some_inter_some theorem union_mem_union [Union α] (a b : Part α) (ma mb : α) (ha : ma ∈ a) (hb : mb ∈ b) : ma ∪ mb ∈ a ∪ b := by simp [union_def]; aesop #align part.union_mem_union Part.union_mem_union theorem left_dom_of_union_dom [Union α] {a b : Part α} (hab : Dom (a ∪ b)) : a.Dom := hab.1 #align part.left_dom_of_union_dom Part.left_dom_of_union_dom theorem right_dom_of_union_dom [Union α] {a b : Part α} (hab : Dom (a ∪ b)) : b.Dom := hab.2 #align part.right_dom_of_union_dom Part.right_dom_of_union_dom @[simp] theorem union_get_eq [Union α] (a b : Part α) (hab : Dom (a ∪ b)) : (a ∪ b).get hab = a.get (left_dom_of_union_dom hab) ∪ b.get (right_dom_of_union_dom hab) := by simp [union_def]; aesop #align part.union_get_eq Part.union_get_eq	Mathlib/Data/Part.lean	859	859	theorem some_union_some [Union α] (a b : α) : some a ∪ some b = some (a ∪ b) := by	simp [union_def]
import Mathlib.Algebra.Group.Defs import Mathlib.Algebra.GroupWithZero.Defs import Mathlib.Data.Int.Cast.Defs import Mathlib.Tactic.Spread import Mathlib.Util.AssertExists #align_import algebra.ring.defs from "leanprover-community/mathlib"@"76de8ae01554c3b37d66544866659ff174e66e1f" universe u v w x variable {α : Type u} {β : Type v} {γ : Type w} {R : Type x} open Function class Distrib (R : Type) extends Mul R, Add R where protected left_distrib : ∀ a b c : R, a (b + c) = a * b + a * c protected right_distrib : ∀ a b c : R, (a + b) * c = a * c + b * c #align distrib Distrib class LeftDistribClass (R : Type) [Mul R] [Add R] : Prop where protected left_distrib : ∀ a b c : R, a (b + c) = a * b + a * c #align left_distrib_class LeftDistribClass class RightDistribClass (R : Type) [Mul R] [Add R] : Prop where protected right_distrib : ∀ a b c : R, (a + b) c = a * c + b * c #align right_distrib_class RightDistribClass -- see Note [lower instance priority] instance (priority := 100) Distrib.leftDistribClass (R : Type) [Distrib R] : LeftDistribClass R := ⟨Distrib.left_distrib⟩ #align distrib.left_distrib_class Distrib.leftDistribClass -- see Note [lower instance priority] instance (priority := 100) Distrib.rightDistribClass (R : Type) [Distrib R] : RightDistribClass R := ⟨Distrib.right_distrib⟩ #align distrib.right_distrib_class Distrib.rightDistribClass theorem left_distrib [Mul R] [Add R] [LeftDistribClass R] (a b c : R) : a * (b + c) = a * b + a * c := LeftDistribClass.left_distrib a b c #align left_distrib left_distrib alias mul_add := left_distrib #align mul_add mul_add theorem right_distrib [Mul R] [Add R] [RightDistribClass R] (a b c : R) : (a + b) * c = a * c + b * c := RightDistribClass.right_distrib a b c #align right_distrib right_distrib alias add_mul := right_distrib #align add_mul add_mul	Mathlib/Algebra/Ring/Defs.lean	94	95	theorem distrib_three_right [Mul R] [Add R] [RightDistribClass R] (a b c d : R) : (a + b + c) * d = a * d + b * d + c * d := by	simp [right_distrib]
import Mathlib.RingTheory.Ideal.IsPrimary import Mathlib.RingTheory.Localization.AtPrime import Mathlib.Order.Minimal #align_import ring_theory.ideal.minimal_prime from "leanprover-community/mathlib"@"70fd9563a21e7b963887c9360bd29b2393e6225a" section variable {R S : Type} [CommSemiring R] [CommSemiring S] (I J : Ideal R) protected def Ideal.minimalPrimes : Set (Ideal R) := minimals (· ≤ ·) { p \| p.IsPrime ∧ I ≤ p } #align ideal.minimal_primes Ideal.minimalPrimes variable (R) in def minimalPrimes : Set (Ideal R) := Ideal.minimalPrimes ⊥ #align minimal_primes minimalPrimes lemma minimalPrimes_eq_minimals : minimalPrimes R = minimals (· ≤ ·) (setOf Ideal.IsPrime) := congr_arg (minimals (· ≤ ·)) (by simp) variable {I J} theorem Ideal.exists_minimalPrimes_le [J.IsPrime] (e : I ≤ J) : ∃ p ∈ I.minimalPrimes, p ≤ J := by suffices ∃ m ∈ { p : (Ideal R)ᵒᵈ \| Ideal.IsPrime p ∧ I ≤ OrderDual.ofDual p }, OrderDual.toDual J ≤ m ∧ ∀ z ∈ { p : (Ideal R)ᵒᵈ \| Ideal.IsPrime p ∧ I ≤ p }, m ≤ z → z = m by obtain ⟨p, h₁, h₂, h₃⟩ := this simp_rw [← @eq_comm _ p] at h₃ exact ⟨p, ⟨h₁, fun a b c => le_of_eq (h₃ a b c)⟩, h₂⟩ apply zorn_nonempty_partialOrder₀ swap · refine ⟨show J.IsPrime by infer_instance, e⟩ rintro (c : Set (Ideal R)) hc hc' J' hJ' refine ⟨OrderDual.toDual (sInf c), ⟨Ideal.sInf_isPrime_of_isChain ⟨J', hJ'⟩ hc'.symm fun x hx => (hc hx).1, ?_⟩, ?_⟩ · rw [OrderDual.ofDual_toDual, le_sInf_iff] exact fun _ hx => (hc hx).2 · rintro z hz rw [OrderDual.le_toDual] exact sInf_le hz #align ideal.exists_minimal_primes_le Ideal.exists_minimalPrimes_le @[simp] theorem Ideal.radical_minimalPrimes : I.radical.minimalPrimes = I.minimalPrimes := by rw [Ideal.minimalPrimes, Ideal.minimalPrimes] ext p refine ⟨?_, ?_⟩ <;> rintro ⟨⟨a, ha⟩, b⟩ · refine ⟨⟨a, a.radical_le_iff.1 ha⟩, ?_⟩ simp only [Set.mem_setOf_eq, and_imp] at exact fun _ h2 h3 h4 => b h2 (h2.radical_le_iff.2 h3) h4 · refine ⟨⟨a, a.radical_le_iff.2 ha⟩, ?_⟩ simp only [Set.mem_setOf_eq, and_imp] at * exact fun _ h2 h3 h4 => b h2 (h2.radical_le_iff.1 h3) h4 #align ideal.radical_minimal_primes Ideal.radical_minimalPrimes @[simp] theorem Ideal.sInf_minimalPrimes : sInf I.minimalPrimes = I.radical := by rw [I.radical_eq_sInf] apply le_antisymm · intro x hx rw [Ideal.mem_sInf] at hx ⊢ rintro J ⟨e, hJ⟩ obtain ⟨p, hp, hp'⟩ := Ideal.exists_minimalPrimes_le e exact hp' (hx hp) · apply sInf_le_sInf _ intro I hI exact hI.1.symm #align ideal.Inf_minimal_primes Ideal.sInf_minimalPrimes	Mathlib/RingTheory/Ideal/MinimalPrime.lean	104	125	theorem Ideal.exists_comap_eq_of_mem_minimalPrimes_of_injective {f : R →+* S} (hf : Function.Injective f) (p) (H : p ∈ minimalPrimes R) : ∃ p' : Ideal S, p'.IsPrime ∧ p'.comap f = p := by	have := H.1.1 have : Nontrivial (Localization (Submonoid.map f p.primeCompl)) := by refine ⟨⟨1, 0, ?_⟩⟩ convert (IsLocalization.map_injective_of_injective p.primeCompl (Localization.AtPrime p) (Localization <\| p.primeCompl.map f) hf).ne one_ne_zero · rw [map_one] · rw [map_zero] obtain ⟨M, hM⟩ := Ideal.exists_maximal (Localization (Submonoid.map f p.primeCompl)) refine ⟨M.comap (algebraMap S <\| Localization (Submonoid.map f p.primeCompl)), inferInstance, ?_⟩ rw [Ideal.comap_comap, ← @IsLocalization.map_comp _ _ _ _ _ _ _ _ Localization.isLocalization _ _ _ _ p.primeCompl.le_comap_map _ Localization.isLocalization, ← Ideal.comap_comap] suffices _ ≤ p by exact this.antisymm (H.2 ⟨inferInstance, bot_le⟩ this) intro x hx by_contra h apply hM.ne_top apply M.eq_top_of_isUnit_mem hx apply IsUnit.map apply IsLocalization.map_units _ (show p.primeCompl from ⟨x, h⟩)
import Mathlib.MeasureTheory.Decomposition.SignedLebesgue import Mathlib.MeasureTheory.Measure.WithDensityVectorMeasure #align_import measure_theory.decomposition.radon_nikodym from "leanprover-community/mathlib"@"fc75855907eaa8ff39791039710f567f37d4556f" noncomputable section open scoped Classical MeasureTheory NNReal ENNReal variable {α β : Type*} {m : MeasurableSpace α} namespace MeasureTheory namespace Measure	Mathlib/MeasureTheory/Decomposition/RadonNikodym.lean	56	66	theorem withDensity_rnDeriv_eq (μ ν : Measure α) [HaveLebesgueDecomposition μ ν] (h : μ ≪ ν) : ν.withDensity (rnDeriv μ ν) = μ := by	suffices μ.singularPart ν = 0 by conv_rhs => rw [haveLebesgueDecomposition_add μ ν, this, zero_add] suffices μ.singularPart ν Set.univ = 0 by simpa using this have h_sing := mutuallySingular_singularPart μ ν rw [← measure_add_measure_compl h_sing.measurableSet_nullSet] simp only [MutuallySingular.measure_nullSet, zero_add] refine le_antisymm ?_ (zero_le _) refine (singularPart_le μ ν ?_ ).trans_eq ?_ exact h h_sing.measure_compl_nullSet
import Mathlib.Data.Complex.Module import Mathlib.Data.Complex.Order import Mathlib.Data.Complex.Exponential import Mathlib.Analysis.RCLike.Basic import Mathlib.Topology.Algebra.InfiniteSum.Module import Mathlib.Topology.Instances.RealVectorSpace #align_import analysis.complex.basic from "leanprover-community/mathlib"@"3f655f5297b030a87d641ad4e825af8d9679eb0b" assert_not_exists Absorbs noncomputable section namespace Complex variable {z : ℂ} open ComplexConjugate Topology Filter instance : Norm ℂ := ⟨abs⟩ @[simp] theorem norm_eq_abs (z : ℂ) : ‖z‖ = abs z := rfl #align complex.norm_eq_abs Complex.norm_eq_abs lemma norm_I : ‖I‖ = 1 := abs_I theorem norm_exp_ofReal_mul_I (t : ℝ) : ‖exp (t * I)‖ = 1 := by simp only [norm_eq_abs, abs_exp_ofReal_mul_I] set_option linter.uppercaseLean3 false in #align complex.norm_exp_of_real_mul_I Complex.norm_exp_ofReal_mul_I instance instNormedAddCommGroup : NormedAddCommGroup ℂ := AddGroupNorm.toNormedAddCommGroup { abs with map_zero' := map_zero abs neg' := abs.map_neg eq_zero_of_map_eq_zero' := fun _ => abs.eq_zero.1 } instance : NormedField ℂ where dist_eq _ _ := rfl norm_mul' := map_mul abs instance : DenselyNormedField ℂ where lt_norm_lt r₁ r₂ h₀ hr := let ⟨x, h⟩ := exists_between hr ⟨x, by rwa [norm_eq_abs, abs_ofReal, abs_of_pos (h₀.trans_lt h.1)]⟩ instance {R : Type} [NormedField R] [NormedAlgebra R ℝ] : NormedAlgebra R ℂ where norm_smul_le r x := by rw [← algebraMap_smul ℝ r x, real_smul, norm_mul, norm_eq_abs, abs_ofReal, ← Real.norm_eq_abs, norm_algebraMap'] variable {E : Type} [SeminormedAddCommGroup E] [NormedSpace ℂ E] -- see Note [lower instance priority] instance (priority := 900) _root_.NormedSpace.complexToReal : NormedSpace ℝ E := NormedSpace.restrictScalars ℝ ℂ E #align normed_space.complex_to_real NormedSpace.complexToReal -- see Note [lower instance priority] instance (priority := 900) _root_.NormedAlgebra.complexToReal {A : Type*} [SeminormedRing A] [NormedAlgebra ℂ A] : NormedAlgebra ℝ A := NormedAlgebra.restrictScalars ℝ ℂ A theorem dist_eq (z w : ℂ) : dist z w = abs (z - w) := rfl #align complex.dist_eq Complex.dist_eq theorem dist_eq_re_im (z w : ℂ) : dist z w = √((z.re - w.re) ^ 2 + (z.im - w.im) ^ 2) := by rw [sq, sq] rfl #align complex.dist_eq_re_im Complex.dist_eq_re_im @[simp] theorem dist_mk (x₁ y₁ x₂ y₂ : ℝ) : dist (mk x₁ y₁) (mk x₂ y₂) = √((x₁ - x₂) ^ 2 + (y₁ - y₂) ^ 2) := dist_eq_re_im _ _ #align complex.dist_mk Complex.dist_mk theorem dist_of_re_eq {z w : ℂ} (h : z.re = w.re) : dist z w = dist z.im w.im := by rw [dist_eq_re_im, h, sub_self, zero_pow two_ne_zero, zero_add, Real.sqrt_sq_eq_abs, Real.dist_eq] #align complex.dist_of_re_eq Complex.dist_of_re_eq theorem nndist_of_re_eq {z w : ℂ} (h : z.re = w.re) : nndist z w = nndist z.im w.im := NNReal.eq <\| dist_of_re_eq h #align complex.nndist_of_re_eq Complex.nndist_of_re_eq	Mathlib/Analysis/Complex/Basic.lean	121	122	theorem edist_of_re_eq {z w : ℂ} (h : z.re = w.re) : edist z w = edist z.im w.im := by	rw [edist_nndist, edist_nndist, nndist_of_re_eq h]
import Mathlib.Topology.MetricSpace.Basic #align_import topology.metric_space.infsep from "leanprover-community/mathlib"@"5316314b553dcf8c6716541851517c1a9715e22b" variable {α β : Type*} namespace Set section Einfsep open ENNReal open Function noncomputable def einfsep [EDist α] (s : Set α) : ℝ≥0∞ := ⨅ (x ∈ s) (y ∈ s) (_ : x ≠ y), edist x y #align set.einfsep Set.einfsep section EDist variable [EDist α] {x y : α} {s t : Set α} theorem le_einfsep_iff {d} : d ≤ s.einfsep ↔ ∀ x ∈ s, ∀ y ∈ s, x ≠ y → d ≤ edist x y := by simp_rw [einfsep, le_iInf_iff] #align set.le_einfsep_iff Set.le_einfsep_iff theorem einfsep_zero : s.einfsep = 0 ↔ ∀ C > 0, ∃ x ∈ s, ∃ y ∈ s, x ≠ y ∧ edist x y < C := by simp_rw [einfsep, ← _root_.bot_eq_zero, iInf_eq_bot, iInf_lt_iff, exists_prop] #align set.einfsep_zero Set.einfsep_zero theorem einfsep_pos : 0 < s.einfsep ↔ ∃ C > 0, ∀ x ∈ s, ∀ y ∈ s, x ≠ y → C ≤ edist x y := by rw [pos_iff_ne_zero, Ne, einfsep_zero] simp only [not_forall, not_exists, not_lt, exists_prop, not_and] #align set.einfsep_pos Set.einfsep_pos theorem einfsep_top : s.einfsep = ∞ ↔ ∀ x ∈ s, ∀ y ∈ s, x ≠ y → edist x y = ∞ := by simp_rw [einfsep, iInf_eq_top] #align set.einfsep_top Set.einfsep_top	Mathlib/Topology/MetricSpace/Infsep.lean	69	71	theorem einfsep_lt_top : s.einfsep < ∞ ↔ ∃ x ∈ s, ∃ y ∈ s, x ≠ y ∧ edist x y < ∞ := by	simp_rw [einfsep, iInf_lt_iff, exists_prop]
import Mathlib.Algebra.Group.Units.Equiv import Mathlib.CategoryTheory.Endomorphism #align_import category_theory.conj from "leanprover-community/mathlib"@"32253a1a1071173b33dc7d6a218cf722c6feb514" universe v u namespace CategoryTheory namespace Iso variable {C : Type u} [Category.{v} C] def homCongr {X Y X₁ Y₁ : C} (α : X ≅ X₁) (β : Y ≅ Y₁) : (X ⟶ Y) ≃ (X₁ ⟶ Y₁) where toFun f := α.inv ≫ f ≫ β.hom invFun f := α.hom ≫ f ≫ β.inv left_inv f := show α.hom ≫ (α.inv ≫ f ≫ β.hom) ≫ β.inv = f by rw [Category.assoc, Category.assoc, β.hom_inv_id, α.hom_inv_id_assoc, Category.comp_id] right_inv f := show α.inv ≫ (α.hom ≫ f ≫ β.inv) ≫ β.hom = f by rw [Category.assoc, Category.assoc, β.inv_hom_id, α.inv_hom_id_assoc, Category.comp_id] #align category_theory.iso.hom_congr CategoryTheory.Iso.homCongr -- @[simp, nolint simpNF] Porting note (#10675): dsimp can not prove this @[simp] theorem homCongr_apply {X Y X₁ Y₁ : C} (α : X ≅ X₁) (β : Y ≅ Y₁) (f : X ⟶ Y) : α.homCongr β f = α.inv ≫ f ≫ β.hom := by rfl #align category_theory.iso.hom_congr_apply CategoryTheory.Iso.homCongr_apply theorem homCongr_comp {X Y Z X₁ Y₁ Z₁ : C} (α : X ≅ X₁) (β : Y ≅ Y₁) (γ : Z ≅ Z₁) (f : X ⟶ Y) (g : Y ⟶ Z) : α.homCongr γ (f ≫ g) = α.homCongr β f ≫ β.homCongr γ g := by simp #align category_theory.iso.hom_congr_comp CategoryTheory.Iso.homCongr_comp	Mathlib/CategoryTheory/Conj.lean	60	60	theorem homCongr_refl {X Y : C} (f : X ⟶ Y) : (Iso.refl X).homCongr (Iso.refl Y) f = f := by	simp
import Mathlib.Algebra.Order.Field.Basic import Mathlib.Algebra.Order.Ring.Rat import Mathlib.Data.Multiset.Sort import Mathlib.Data.PNat.Basic import Mathlib.Data.PNat.Interval import Mathlib.Tactic.NormNum import Mathlib.Tactic.IntervalCases #align_import number_theory.ADE_inequality from "leanprover-community/mathlib"@"0a0ec35061ed9960bf0e7ffb0335f44447b58977" namespace ADEInequality open Multiset -- Porting note: ADE is a special name, exceptionally in upper case in Lean3 set_option linter.uppercaseLean3 false def A' (q r : ℕ+) : Multiset ℕ+ := {1, q, r} #align ADE_inequality.A' ADEInequality.A' def A (r : ℕ+) : Multiset ℕ+ := A' 1 r #align ADE_inequality.A ADEInequality.A def D' (r : ℕ+) : Multiset ℕ+ := {2, 2, r} #align ADE_inequality.D' ADEInequality.D' def E' (r : ℕ+) : Multiset ℕ+ := {2, 3, r} #align ADE_inequality.E' ADEInequality.E' def E6 : Multiset ℕ+ := E' 3 #align ADE_inequality.E6 ADEInequality.E6 def E7 : Multiset ℕ+ := E' 4 #align ADE_inequality.E7 ADEInequality.E7 def E8 : Multiset ℕ+ := E' 5 #align ADE_inequality.E8 ADEInequality.E8 def sumInv (pqr : Multiset ℕ+) : ℚ := Multiset.sum (pqr.map fun (x : ℕ+) => x⁻¹) #align ADE_inequality.sum_inv ADEInequality.sumInv theorem sumInv_pqr (p q r : ℕ+) : sumInv {p, q, r} = (p : ℚ)⁻¹ + (q : ℚ)⁻¹ + (r : ℚ)⁻¹ := by simp only [sumInv, add_zero, insert_eq_cons, add_assoc, map_cons, sum_cons, map_singleton, sum_singleton] #align ADE_inequality.sum_inv_pqr ADEInequality.sumInv_pqr def Admissible (pqr : Multiset ℕ+) : Prop := (∃ q r, A' q r = pqr) ∨ (∃ r, D' r = pqr) ∨ E' 3 = pqr ∨ E' 4 = pqr ∨ E' 5 = pqr #align ADE_inequality.admissible ADEInequality.Admissible theorem admissible_A' (q r : ℕ+) : Admissible (A' q r) := Or.inl ⟨q, r, rfl⟩ #align ADE_inequality.admissible_A' ADEInequality.admissible_A' theorem admissible_D' (n : ℕ+) : Admissible (D' n) := Or.inr <\| Or.inl ⟨n, rfl⟩ #align ADE_inequality.admissible_D' ADEInequality.admissible_D' theorem admissible_E'3 : Admissible (E' 3) := Or.inr <\| Or.inr <\| Or.inl rfl #align ADE_inequality.admissible_E'3 ADEInequality.admissible_E'3 theorem admissible_E'4 : Admissible (E' 4) := Or.inr <\| Or.inr <\| Or.inr <\| Or.inl rfl #align ADE_inequality.admissible_E'4 ADEInequality.admissible_E'4 theorem admissible_E'5 : Admissible (E' 5) := Or.inr <\| Or.inr <\| Or.inr <\| Or.inr rfl #align ADE_inequality.admissible_E'5 ADEInequality.admissible_E'5 theorem admissible_E6 : Admissible E6 := admissible_E'3 #align ADE_inequality.admissible_E6 ADEInequality.admissible_E6 theorem admissible_E7 : Admissible E7 := admissible_E'4 #align ADE_inequality.admissible_E7 ADEInequality.admissible_E7 theorem admissible_E8 : Admissible E8 := admissible_E'5 #align ADE_inequality.admissible_E8 ADEInequality.admissible_E8 theorem Admissible.one_lt_sumInv {pqr : Multiset ℕ+} : Admissible pqr → 1 < sumInv pqr := by rw [Admissible] rintro (⟨p', q', H⟩ \| ⟨n, H⟩ \| H \| H \| H) · rw [← H, A', sumInv_pqr, add_assoc] simp only [lt_add_iff_pos_right, PNat.one_coe, inv_one, Nat.cast_one] apply add_pos <;> simp only [PNat.pos, Nat.cast_pos, inv_pos] · rw [← H, D', sumInv_pqr] conv_rhs => simp only [OfNat.ofNat, PNat.mk_coe] norm_num all_goals rw [← H, E', sumInv_pqr] conv_rhs => simp only [OfNat.ofNat, PNat.mk_coe] rfl #align ADE_inequality.admissible.one_lt_sum_inv ADEInequality.Admissible.one_lt_sumInv theorem lt_three {p q r : ℕ+} (hpq : p ≤ q) (hqr : q ≤ r) (H : 1 < sumInv {p, q, r}) : p < 3 := by have h3 : (0 : ℚ) < 3 := by norm_num contrapose! H rw [sumInv_pqr] have h3q := H.trans hpq have h3r := h3q.trans hqr have hp: (p : ℚ)⁻¹ ≤ 3⁻¹ := by rw [inv_le_inv _ h3] · assumption_mod_cast · norm_num have hq: (q : ℚ)⁻¹ ≤ 3⁻¹ := by rw [inv_le_inv _ h3] · assumption_mod_cast · norm_num have hr: (r : ℚ)⁻¹ ≤ 3⁻¹ := by rw [inv_le_inv _ h3] · assumption_mod_cast · norm_num calc (p : ℚ)⁻¹ + (q : ℚ)⁻¹ + (r : ℚ)⁻¹ ≤ 3⁻¹ + 3⁻¹ + 3⁻¹ := add_le_add (add_le_add hp hq) hr _ = 1 := by norm_num #align ADE_inequality.lt_three ADEInequality.lt_three theorem lt_four {q r : ℕ+} (hqr : q ≤ r) (H : 1 < sumInv {2, q, r}) : q < 4 := by have h4 : (0 : ℚ) < 4 := by norm_num contrapose! H rw [sumInv_pqr] have h4r := H.trans hqr have hq: (q : ℚ)⁻¹ ≤ 4⁻¹ := by rw [inv_le_inv _ h4] · assumption_mod_cast · norm_num have hr: (r : ℚ)⁻¹ ≤ 4⁻¹ := by rw [inv_le_inv _ h4] · assumption_mod_cast · norm_num calc (2⁻¹ + (q : ℚ)⁻¹ + (r : ℚ)⁻¹) ≤ 2⁻¹ + 4⁻¹ + 4⁻¹ := add_le_add (add_le_add le_rfl hq) hr _ = 1 := by norm_num #align ADE_inequality.lt_four ADEInequality.lt_four theorem lt_six {r : ℕ+} (H : 1 < sumInv {2, 3, r}) : r < 6 := by have h6 : (0 : ℚ) < 6 := by norm_num contrapose! H rw [sumInv_pqr] have hr: (r : ℚ)⁻¹ ≤ 6⁻¹ := by rw [inv_le_inv _ h6] · assumption_mod_cast · norm_num calc (2⁻¹ + 3⁻¹ + (r : ℚ)⁻¹ : ℚ) ≤ 2⁻¹ + 3⁻¹ + 6⁻¹ := add_le_add (add_le_add le_rfl le_rfl) hr _ = 1 := by norm_num #align ADE_inequality.lt_six ADEInequality.lt_six theorem admissible_of_one_lt_sumInv_aux' {p q r : ℕ+} (hpq : p ≤ q) (hqr : q ≤ r) (H : 1 < sumInv {p, q, r}) : Admissible {p, q, r} := by have hp3 : p < 3 := lt_three hpq hqr H -- Porting note: `interval_cases` doesn't support `ℕ+` yet. replace hp3 := Finset.mem_Iio.mpr hp3 conv at hp3 => change p ∈ ({1, 2} : Multiset ℕ+) fin_cases hp3 · exact admissible_A' q r have hq4 : q < 4 := lt_four hqr H replace hq4 := Finset.mem_Ico.mpr ⟨hpq, hq4⟩; clear hpq conv at hq4 => change q ∈ ({2, 3} : Multiset ℕ+) fin_cases hq4 · exact admissible_D' r have hr6 : r < 6 := lt_six H replace hr6 := Finset.mem_Ico.mpr ⟨hqr, hr6⟩; clear hqr conv at hr6 => change r ∈ ({3, 4, 5} : Multiset ℕ+) fin_cases hr6 · exact admissible_E6 · exact admissible_E7 · exact admissible_E8 #align ADE_inequality.admissible_of_one_lt_sum_inv_aux' ADEInequality.admissible_of_one_lt_sumInv_aux'	Mathlib/NumberTheory/ADEInequality.lean	251	256	theorem admissible_of_one_lt_sumInv_aux : ∀ {pqr : List ℕ+} (_ : pqr.Sorted (· ≤ ·)) (_ : pqr.length = 3) (_ : 1 < sumInv pqr), Admissible pqr \| [p, q, r], hs, _, H => by obtain ⟨⟨hpq, -⟩, hqr⟩ : (p ≤ q ∧ p ≤ r) ∧ q ≤ r := by	simpa using hs exact admissible_of_one_lt_sumInv_aux' hpq hqr H
import Mathlib.Logic.Pairwise import Mathlib.Order.CompleteBooleanAlgebra import Mathlib.Order.Directed import Mathlib.Order.GaloisConnection #align_import data.set.lattice from "leanprover-community/mathlib"@"b86832321b586c6ac23ef8cdef6a7a27e42b13bd" open Function Set universe u variable {α β γ : Type} {ι ι' ι₂ : Sort} {κ κ₁ κ₂ : ι → Sort} {κ' : ι' → Sort} namespace Set theorem mem_iUnion₂ {x : γ} {s : ∀ i, κ i → Set γ} : (x ∈ ⋃ (i) (j), s i j) ↔ ∃ i j, x ∈ s i j := by simp_rw [mem_iUnion] #align set.mem_Union₂ Set.mem_iUnion₂ theorem mem_iInter₂ {x : γ} {s : ∀ i, κ i → Set γ} : (x ∈ ⋂ (i) (j), s i j) ↔ ∀ i j, x ∈ s i j := by simp_rw [mem_iInter] #align set.mem_Inter₂ Set.mem_iInter₂ theorem mem_iUnion_of_mem {s : ι → Set α} {a : α} (i : ι) (ha : a ∈ s i) : a ∈ ⋃ i, s i := mem_iUnion.2 ⟨i, ha⟩ #align set.mem_Union_of_mem Set.mem_iUnion_of_mem theorem mem_iUnion₂_of_mem {s : ∀ i, κ i → Set α} {a : α} {i : ι} (j : κ i) (ha : a ∈ s i j) : a ∈ ⋃ (i) (j), s i j := mem_iUnion₂.2 ⟨i, j, ha⟩ #align set.mem_Union₂_of_mem Set.mem_iUnion₂_of_mem theorem mem_iInter_of_mem {s : ι → Set α} {a : α} (h : ∀ i, a ∈ s i) : a ∈ ⋂ i, s i := mem_iInter.2 h #align set.mem_Inter_of_mem Set.mem_iInter_of_mem theorem mem_iInter₂_of_mem {s : ∀ i, κ i → Set α} {a : α} (h : ∀ i j, a ∈ s i j) : a ∈ ⋂ (i) (j), s i j := mem_iInter₂.2 h #align set.mem_Inter₂_of_mem Set.mem_iInter₂_of_mem instance completeAtomicBooleanAlgebra : CompleteAtomicBooleanAlgebra (Set α) := { instBooleanAlgebraSet with le_sSup := fun s t t_in a a_in => ⟨t, t_in, a_in⟩ sSup_le := fun s t h a ⟨t', ⟨t'_in, a_in⟩⟩ => h t' t'_in a_in le_sInf := fun s t h a a_in t' t'_in => h t' t'_in a_in sInf_le := fun s t t_in a h => h _ t_in iInf_iSup_eq := by intros; ext; simp [Classical.skolem] } instance : OrderTop (Set α) where top := univ le_top := by simp @[congr] theorem iUnion_congr_Prop {p q : Prop} {f₁ : p → Set α} {f₂ : q → Set α} (pq : p ↔ q) (f : ∀ x, f₁ (pq.mpr x) = f₂ x) : iUnion f₁ = iUnion f₂ := iSup_congr_Prop pq f #align set.Union_congr_Prop Set.iUnion_congr_Prop @[congr] theorem iInter_congr_Prop {p q : Prop} {f₁ : p → Set α} {f₂ : q → Set α} (pq : p ↔ q) (f : ∀ x, f₁ (pq.mpr x) = f₂ x) : iInter f₁ = iInter f₂ := iInf_congr_Prop pq f #align set.Inter_congr_Prop Set.iInter_congr_Prop theorem iUnion_plift_up (f : PLift ι → Set α) : ⋃ i, f (PLift.up i) = ⋃ i, f i := iSup_plift_up _ #align set.Union_plift_up Set.iUnion_plift_up theorem iUnion_plift_down (f : ι → Set α) : ⋃ i, f (PLift.down i) = ⋃ i, f i := iSup_plift_down _ #align set.Union_plift_down Set.iUnion_plift_down theorem iInter_plift_up (f : PLift ι → Set α) : ⋂ i, f (PLift.up i) = ⋂ i, f i := iInf_plift_up _ #align set.Inter_plift_up Set.iInter_plift_up theorem iInter_plift_down (f : ι → Set α) : ⋂ i, f (PLift.down i) = ⋂ i, f i := iInf_plift_down _ #align set.Inter_plift_down Set.iInter_plift_down theorem iUnion_eq_if {p : Prop} [Decidable p] (s : Set α) : ⋃ _ : p, s = if p then s else ∅ := iSup_eq_if _ #align set.Union_eq_if Set.iUnion_eq_if theorem iUnion_eq_dif {p : Prop} [Decidable p] (s : p → Set α) : ⋃ h : p, s h = if h : p then s h else ∅ := iSup_eq_dif _ #align set.Union_eq_dif Set.iUnion_eq_dif theorem iInter_eq_if {p : Prop} [Decidable p] (s : Set α) : ⋂ _ : p, s = if p then s else univ := iInf_eq_if _ #align set.Inter_eq_if Set.iInter_eq_if theorem iInf_eq_dif {p : Prop} [Decidable p] (s : p → Set α) : ⋂ h : p, s h = if h : p then s h else univ := _root_.iInf_eq_dif _ #align set.Infi_eq_dif Set.iInf_eq_dif theorem exists_set_mem_of_union_eq_top {ι : Type} (t : Set ι) (s : ι → Set β) (w : ⋃ i ∈ t, s i = ⊤) (x : β) : ∃ i ∈ t, x ∈ s i := by have p : x ∈ ⊤ := Set.mem_univ x rw [← w, Set.mem_iUnion] at p simpa using p #align set.exists_set_mem_of_union_eq_top Set.exists_set_mem_of_union_eq_top theorem nonempty_of_union_eq_top_of_nonempty {ι : Type} (t : Set ι) (s : ι → Set α) (H : Nonempty α) (w : ⋃ i ∈ t, s i = ⊤) : t.Nonempty := by obtain ⟨x, m, -⟩ := exists_set_mem_of_union_eq_top t s w H.some exact ⟨x, m⟩ #align set.nonempty_of_union_eq_top_of_nonempty Set.nonempty_of_union_eq_top_of_nonempty theorem nonempty_of_nonempty_iUnion {s : ι → Set α} (h_Union : (⋃ i, s i).Nonempty) : Nonempty ι := by obtain ⟨x, hx⟩ := h_Union exact ⟨Classical.choose <\| mem_iUnion.mp hx⟩ theorem nonempty_of_nonempty_iUnion_eq_univ {s : ι → Set α} [Nonempty α] (h_Union : ⋃ i, s i = univ) : Nonempty ι := nonempty_of_nonempty_iUnion (s := s) (by simpa only [h_Union] using univ_nonempty) theorem setOf_exists (p : ι → β → Prop) : { x \| ∃ i, p i x } = ⋃ i, { x \| p i x } := ext fun _ => mem_iUnion.symm #align set.set_of_exists Set.setOf_exists theorem setOf_forall (p : ι → β → Prop) : { x \| ∀ i, p i x } = ⋂ i, { x \| p i x } := ext fun _ => mem_iInter.symm #align set.set_of_forall Set.setOf_forall theorem iUnion_subset {s : ι → Set α} {t : Set α} (h : ∀ i, s i ⊆ t) : ⋃ i, s i ⊆ t := iSup_le h #align set.Union_subset Set.iUnion_subset theorem iUnion₂_subset {s : ∀ i, κ i → Set α} {t : Set α} (h : ∀ i j, s i j ⊆ t) : ⋃ (i) (j), s i j ⊆ t := iUnion_subset fun x => iUnion_subset (h x) #align set.Union₂_subset Set.iUnion₂_subset theorem subset_iInter {t : Set β} {s : ι → Set β} (h : ∀ i, t ⊆ s i) : t ⊆ ⋂ i, s i := le_iInf h #align set.subset_Inter Set.subset_iInter theorem subset_iInter₂ {s : Set α} {t : ∀ i, κ i → Set α} (h : ∀ i j, s ⊆ t i j) : s ⊆ ⋂ (i) (j), t i j := subset_iInter fun x => subset_iInter <\| h x #align set.subset_Inter₂ Set.subset_iInter₂ @[simp] theorem iUnion_subset_iff {s : ι → Set α} {t : Set α} : ⋃ i, s i ⊆ t ↔ ∀ i, s i ⊆ t := ⟨fun h _ => Subset.trans (le_iSup s _) h, iUnion_subset⟩ #align set.Union_subset_iff Set.iUnion_subset_iff theorem iUnion₂_subset_iff {s : ∀ i, κ i → Set α} {t : Set α} : ⋃ (i) (j), s i j ⊆ t ↔ ∀ i j, s i j ⊆ t := by simp_rw [iUnion_subset_iff] #align set.Union₂_subset_iff Set.iUnion₂_subset_iff @[simp] theorem subset_iInter_iff {s : Set α} {t : ι → Set α} : (s ⊆ ⋂ i, t i) ↔ ∀ i, s ⊆ t i := le_iInf_iff #align set.subset_Inter_iff Set.subset_iInter_iff -- Porting note (#10618): removing `simp`. `simp` can prove it theorem subset_iInter₂_iff {s : Set α} {t : ∀ i, κ i → Set α} : (s ⊆ ⋂ (i) (j), t i j) ↔ ∀ i j, s ⊆ t i j := by simp_rw [subset_iInter_iff] #align set.subset_Inter₂_iff Set.subset_iInter₂_iff theorem subset_iUnion : ∀ (s : ι → Set β) (i : ι), s i ⊆ ⋃ i, s i := le_iSup #align set.subset_Union Set.subset_iUnion theorem iInter_subset : ∀ (s : ι → Set β) (i : ι), ⋂ i, s i ⊆ s i := iInf_le #align set.Inter_subset Set.iInter_subset theorem subset_iUnion₂ {s : ∀ i, κ i → Set α} (i : ι) (j : κ i) : s i j ⊆ ⋃ (i') (j'), s i' j' := le_iSup₂ i j #align set.subset_Union₂ Set.subset_iUnion₂ theorem iInter₂_subset {s : ∀ i, κ i → Set α} (i : ι) (j : κ i) : ⋂ (i) (j), s i j ⊆ s i j := iInf₂_le i j #align set.Inter₂_subset Set.iInter₂_subset theorem subset_iUnion_of_subset {s : Set α} {t : ι → Set α} (i : ι) (h : s ⊆ t i) : s ⊆ ⋃ i, t i := le_iSup_of_le i h #align set.subset_Union_of_subset Set.subset_iUnion_of_subset theorem iInter_subset_of_subset {s : ι → Set α} {t : Set α} (i : ι) (h : s i ⊆ t) : ⋂ i, s i ⊆ t := iInf_le_of_le i h #align set.Inter_subset_of_subset Set.iInter_subset_of_subset theorem subset_iUnion₂_of_subset {s : Set α} {t : ∀ i, κ i → Set α} (i : ι) (j : κ i) (h : s ⊆ t i j) : s ⊆ ⋃ (i) (j), t i j := le_iSup₂_of_le i j h #align set.subset_Union₂_of_subset Set.subset_iUnion₂_of_subset theorem iInter₂_subset_of_subset {s : ∀ i, κ i → Set α} {t : Set α} (i : ι) (j : κ i) (h : s i j ⊆ t) : ⋂ (i) (j), s i j ⊆ t := iInf₂_le_of_le i j h #align set.Inter₂_subset_of_subset Set.iInter₂_subset_of_subset theorem iUnion_mono {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : ⋃ i, s i ⊆ ⋃ i, t i := iSup_mono h #align set.Union_mono Set.iUnion_mono @[gcongr] theorem iUnion_mono'' {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : iUnion s ⊆ iUnion t := iSup_mono h theorem iUnion₂_mono {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j ⊆ t i j) : ⋃ (i) (j), s i j ⊆ ⋃ (i) (j), t i j := iSup₂_mono h #align set.Union₂_mono Set.iUnion₂_mono theorem iInter_mono {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : ⋂ i, s i ⊆ ⋂ i, t i := iInf_mono h #align set.Inter_mono Set.iInter_mono @[gcongr] theorem iInter_mono'' {s t : ι → Set α} (h : ∀ i, s i ⊆ t i) : iInter s ⊆ iInter t := iInf_mono h theorem iInter₂_mono {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j ⊆ t i j) : ⋂ (i) (j), s i j ⊆ ⋂ (i) (j), t i j := iInf₂_mono h #align set.Inter₂_mono Set.iInter₂_mono theorem iUnion_mono' {s : ι → Set α} {t : ι₂ → Set α} (h : ∀ i, ∃ j, s i ⊆ t j) : ⋃ i, s i ⊆ ⋃ i, t i := iSup_mono' h #align set.Union_mono' Set.iUnion_mono' theorem iUnion₂_mono' {s : ∀ i, κ i → Set α} {t : ∀ i', κ' i' → Set α} (h : ∀ i j, ∃ i' j', s i j ⊆ t i' j') : ⋃ (i) (j), s i j ⊆ ⋃ (i') (j'), t i' j' := iSup₂_mono' h #align set.Union₂_mono' Set.iUnion₂_mono' theorem iInter_mono' {s : ι → Set α} {t : ι' → Set α} (h : ∀ j, ∃ i, s i ⊆ t j) : ⋂ i, s i ⊆ ⋂ j, t j := Set.subset_iInter fun j => let ⟨i, hi⟩ := h j iInter_subset_of_subset i hi #align set.Inter_mono' Set.iInter_mono' theorem iInter₂_mono' {s : ∀ i, κ i → Set α} {t : ∀ i', κ' i' → Set α} (h : ∀ i' j', ∃ i j, s i j ⊆ t i' j') : ⋂ (i) (j), s i j ⊆ ⋂ (i') (j'), t i' j' := subset_iInter₂_iff.2 fun i' j' => let ⟨_, _, hst⟩ := h i' j' (iInter₂_subset _ _).trans hst #align set.Inter₂_mono' Set.iInter₂_mono' theorem iUnion₂_subset_iUnion (κ : ι → Sort) (s : ι → Set α) : ⋃ (i) (_ : κ i), s i ⊆ ⋃ i, s i := iUnion_mono fun _ => iUnion_subset fun _ => Subset.rfl #align set.Union₂_subset_Union Set.iUnion₂_subset_iUnion theorem iInter_subset_iInter₂ (κ : ι → Sort) (s : ι → Set α) : ⋂ i, s i ⊆ ⋂ (i) (_ : κ i), s i := iInter_mono fun _ => subset_iInter fun _ => Subset.rfl #align set.Inter_subset_Inter₂ Set.iInter_subset_iInter₂ theorem iUnion_setOf (P : ι → α → Prop) : ⋃ i, { x : α \| P i x } = { x : α \| ∃ i, P i x } := by ext exact mem_iUnion #align set.Union_set_of Set.iUnion_setOf theorem iInter_setOf (P : ι → α → Prop) : ⋂ i, { x : α \| P i x } = { x : α \| ∀ i, P i x } := by ext exact mem_iInter #align set.Inter_set_of Set.iInter_setOf theorem iUnion_congr_of_surjective {f : ι → Set α} {g : ι₂ → Set α} (h : ι → ι₂) (h1 : Surjective h) (h2 : ∀ x, g (h x) = f x) : ⋃ x, f x = ⋃ y, g y := h1.iSup_congr h h2 #align set.Union_congr_of_surjective Set.iUnion_congr_of_surjective theorem iInter_congr_of_surjective {f : ι → Set α} {g : ι₂ → Set α} (h : ι → ι₂) (h1 : Surjective h) (h2 : ∀ x, g (h x) = f x) : ⋂ x, f x = ⋂ y, g y := h1.iInf_congr h h2 #align set.Inter_congr_of_surjective Set.iInter_congr_of_surjective lemma iUnion_congr {s t : ι → Set α} (h : ∀ i, s i = t i) : ⋃ i, s i = ⋃ i, t i := iSup_congr h #align set.Union_congr Set.iUnion_congr lemma iInter_congr {s t : ι → Set α} (h : ∀ i, s i = t i) : ⋂ i, s i = ⋂ i, t i := iInf_congr h #align set.Inter_congr Set.iInter_congr lemma iUnion₂_congr {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j = t i j) : ⋃ (i) (j), s i j = ⋃ (i) (j), t i j := iUnion_congr fun i => iUnion_congr <\| h i #align set.Union₂_congr Set.iUnion₂_congr lemma iInter₂_congr {s t : ∀ i, κ i → Set α} (h : ∀ i j, s i j = t i j) : ⋂ (i) (j), s i j = ⋂ (i) (j), t i j := iInter_congr fun i => iInter_congr <\| h i #align set.Inter₂_congr Set.iInter₂_congr @[simp] theorem compl_iUnion (s : ι → Set β) : (⋃ i, s i)ᶜ = ⋂ i, (s i)ᶜ := compl_iSup #align set.compl_Union Set.compl_iUnion theorem compl_iUnion₂ (s : ∀ i, κ i → Set α) : (⋃ (i) (j), s i j)ᶜ = ⋂ (i) (j), (s i j)ᶜ := by simp_rw [compl_iUnion] #align set.compl_Union₂ Set.compl_iUnion₂ @[simp] theorem compl_iInter (s : ι → Set β) : (⋂ i, s i)ᶜ = ⋃ i, (s i)ᶜ := compl_iInf #align set.compl_Inter Set.compl_iInter theorem compl_iInter₂ (s : ∀ i, κ i → Set α) : (⋂ (i) (j), s i j)ᶜ = ⋃ (i) (j), (s i j)ᶜ := by simp_rw [compl_iInter] #align set.compl_Inter₂ Set.compl_iInter₂ -- classical -- complete_boolean_algebra theorem iUnion_eq_compl_iInter_compl (s : ι → Set β) : ⋃ i, s i = (⋂ i, (s i)ᶜ)ᶜ := by simp only [compl_iInter, compl_compl] #align set.Union_eq_compl_Inter_compl Set.iUnion_eq_compl_iInter_compl -- classical -- complete_boolean_algebra theorem iInter_eq_compl_iUnion_compl (s : ι → Set β) : ⋂ i, s i = (⋃ i, (s i)ᶜ)ᶜ := by simp only [compl_iUnion, compl_compl] #align set.Inter_eq_compl_Union_compl Set.iInter_eq_compl_iUnion_compl theorem inter_iUnion (s : Set β) (t : ι → Set β) : (s ∩ ⋃ i, t i) = ⋃ i, s ∩ t i := inf_iSup_eq _ _ #align set.inter_Union Set.inter_iUnion theorem iUnion_inter (s : Set β) (t : ι → Set β) : (⋃ i, t i) ∩ s = ⋃ i, t i ∩ s := iSup_inf_eq _ _ #align set.Union_inter Set.iUnion_inter theorem iUnion_union_distrib (s : ι → Set β) (t : ι → Set β) : ⋃ i, s i ∪ t i = (⋃ i, s i) ∪ ⋃ i, t i := iSup_sup_eq #align set.Union_union_distrib Set.iUnion_union_distrib theorem iInter_inter_distrib (s : ι → Set β) (t : ι → Set β) : ⋂ i, s i ∩ t i = (⋂ i, s i) ∩ ⋂ i, t i := iInf_inf_eq #align set.Inter_inter_distrib Set.iInter_inter_distrib theorem union_iUnion [Nonempty ι] (s : Set β) (t : ι → Set β) : (s ∪ ⋃ i, t i) = ⋃ i, s ∪ t i := sup_iSup #align set.union_Union Set.union_iUnion theorem iUnion_union [Nonempty ι] (s : Set β) (t : ι → Set β) : (⋃ i, t i) ∪ s = ⋃ i, t i ∪ s := iSup_sup #align set.Union_union Set.iUnion_union theorem inter_iInter [Nonempty ι] (s : Set β) (t : ι → Set β) : (s ∩ ⋂ i, t i) = ⋂ i, s ∩ t i := inf_iInf #align set.inter_Inter Set.inter_iInter theorem iInter_inter [Nonempty ι] (s : Set β) (t : ι → Set β) : (⋂ i, t i) ∩ s = ⋂ i, t i ∩ s := iInf_inf #align set.Inter_inter Set.iInter_inter -- classical theorem union_iInter (s : Set β) (t : ι → Set β) : (s ∪ ⋂ i, t i) = ⋂ i, s ∪ t i := sup_iInf_eq _ _ #align set.union_Inter Set.union_iInter theorem iInter_union (s : ι → Set β) (t : Set β) : (⋂ i, s i) ∪ t = ⋂ i, s i ∪ t := iInf_sup_eq _ _ #align set.Inter_union Set.iInter_union theorem iUnion_diff (s : Set β) (t : ι → Set β) : (⋃ i, t i) \ s = ⋃ i, t i \ s := iUnion_inter _ _ #align set.Union_diff Set.iUnion_diff theorem diff_iUnion [Nonempty ι] (s : Set β) (t : ι → Set β) : (s \ ⋃ i, t i) = ⋂ i, s \ t i := by rw [diff_eq, compl_iUnion, inter_iInter]; rfl #align set.diff_Union Set.diff_iUnion theorem diff_iInter (s : Set β) (t : ι → Set β) : (s \ ⋂ i, t i) = ⋃ i, s \ t i := by rw [diff_eq, compl_iInter, inter_iUnion]; rfl #align set.diff_Inter Set.diff_iInter theorem iUnion_inter_subset {ι α} {s t : ι → Set α} : ⋃ i, s i ∩ t i ⊆ (⋃ i, s i) ∩ ⋃ i, t i := le_iSup_inf_iSup s t #align set.Union_inter_subset Set.iUnion_inter_subset theorem iUnion_inter_of_monotone {ι α} [Preorder ι] [IsDirected ι (· ≤ ·)] {s t : ι → Set α} (hs : Monotone s) (ht : Monotone t) : ⋃ i, s i ∩ t i = (⋃ i, s i) ∩ ⋃ i, t i := iSup_inf_of_monotone hs ht #align set.Union_inter_of_monotone Set.iUnion_inter_of_monotone theorem iUnion_inter_of_antitone {ι α} [Preorder ι] [IsDirected ι (swap (· ≤ ·))] {s t : ι → Set α} (hs : Antitone s) (ht : Antitone t) : ⋃ i, s i ∩ t i = (⋃ i, s i) ∩ ⋃ i, t i := iSup_inf_of_antitone hs ht #align set.Union_inter_of_antitone Set.iUnion_inter_of_antitone theorem iInter_union_of_monotone {ι α} [Preorder ι] [IsDirected ι (swap (· ≤ ·))] {s t : ι → Set α} (hs : Monotone s) (ht : Monotone t) : ⋂ i, s i ∪ t i = (⋂ i, s i) ∪ ⋂ i, t i := iInf_sup_of_monotone hs ht #align set.Inter_union_of_monotone Set.iInter_union_of_monotone theorem iInter_union_of_antitone {ι α} [Preorder ι] [IsDirected ι (· ≤ ·)] {s t : ι → Set α} (hs : Antitone s) (ht : Antitone t) : ⋂ i, s i ∪ t i = (⋂ i, s i) ∪ ⋂ i, t i := iInf_sup_of_antitone hs ht #align set.Inter_union_of_antitone Set.iInter_union_of_antitone theorem iUnion_iInter_subset {s : ι → ι' → Set α} : (⋃ j, ⋂ i, s i j) ⊆ ⋂ i, ⋃ j, s i j := iSup_iInf_le_iInf_iSup (flip s) #align set.Union_Inter_subset Set.iUnion_iInter_subset theorem iUnion_option {ι} (s : Option ι → Set α) : ⋃ o, s o = s none ∪ ⋃ i, s (some i) := iSup_option s #align set.Union_option Set.iUnion_option theorem iInter_option {ι} (s : Option ι → Set α) : ⋂ o, s o = s none ∩ ⋂ i, s (some i) := iInf_option s #align set.Inter_option Set.iInter_option section variable (p : ι → Prop) [DecidablePred p] theorem iUnion_dite (f : ∀ i, p i → Set α) (g : ∀ i, ¬p i → Set α) : ⋃ i, (if h : p i then f i h else g i h) = (⋃ (i) (h : p i), f i h) ∪ ⋃ (i) (h : ¬p i), g i h := iSup_dite _ _ _ #align set.Union_dite Set.iUnion_dite theorem iUnion_ite (f g : ι → Set α) : ⋃ i, (if p i then f i else g i) = (⋃ (i) (_ : p i), f i) ∪ ⋃ (i) (_ : ¬p i), g i := iUnion_dite _ _ _ #align set.Union_ite Set.iUnion_ite theorem iInter_dite (f : ∀ i, p i → Set α) (g : ∀ i, ¬p i → Set α) : ⋂ i, (if h : p i then f i h else g i h) = (⋂ (i) (h : p i), f i h) ∩ ⋂ (i) (h : ¬p i), g i h := iInf_dite _ _ _ #align set.Inter_dite Set.iInter_dite theorem iInter_ite (f g : ι → Set α) : ⋂ i, (if p i then f i else g i) = (⋂ (i) (_ : p i), f i) ∩ ⋂ (i) (_ : ¬p i), g i := iInter_dite _ _ _ #align set.Inter_ite Set.iInter_ite end theorem image_projection_prod {ι : Type} {α : ι → Type} {v : ∀ i : ι, Set (α i)} (hv : (pi univ v).Nonempty) (i : ι) : ((fun x : ∀ i : ι, α i => x i) '' ⋂ k, (fun x : ∀ j : ι, α j => x k) ⁻¹' v k) = v i := by classical apply Subset.antisymm · simp [iInter_subset] · intro y y_in simp only [mem_image, mem_iInter, mem_preimage] rcases hv with ⟨z, hz⟩ refine ⟨Function.update z i y, ?_, update_same i y z⟩ rw [@forall_update_iff ι α _ z i y fun i t => t ∈ v i] exact ⟨y_in, fun j _ => by simpa using hz j⟩ #align set.image_projection_prod Set.image_projection_prod theorem iInter_false {s : False → Set α} : iInter s = univ := iInf_false #align set.Inter_false Set.iInter_false theorem iUnion_false {s : False → Set α} : iUnion s = ∅ := iSup_false #align set.Union_false Set.iUnion_false @[simp] theorem iInter_true {s : True → Set α} : iInter s = s trivial := iInf_true #align set.Inter_true Set.iInter_true @[simp] theorem iUnion_true {s : True → Set α} : iUnion s = s trivial := iSup_true #align set.Union_true Set.iUnion_true @[simp] theorem iInter_exists {p : ι → Prop} {f : Exists p → Set α} : ⋂ x, f x = ⋂ (i) (h : p i), f ⟨i, h⟩ := iInf_exists #align set.Inter_exists Set.iInter_exists @[simp] theorem iUnion_exists {p : ι → Prop} {f : Exists p → Set α} : ⋃ x, f x = ⋃ (i) (h : p i), f ⟨i, h⟩ := iSup_exists #align set.Union_exists Set.iUnion_exists @[simp] theorem iUnion_empty : (⋃ _ : ι, ∅ : Set α) = ∅ := iSup_bot #align set.Union_empty Set.iUnion_empty @[simp] theorem iInter_univ : (⋂ _ : ι, univ : Set α) = univ := iInf_top #align set.Inter_univ Set.iInter_univ section variable {s : ι → Set α} @[simp] theorem iUnion_eq_empty : ⋃ i, s i = ∅ ↔ ∀ i, s i = ∅ := iSup_eq_bot #align set.Union_eq_empty Set.iUnion_eq_empty @[simp] theorem iInter_eq_univ : ⋂ i, s i = univ ↔ ∀ i, s i = univ := iInf_eq_top #align set.Inter_eq_univ Set.iInter_eq_univ @[simp] theorem nonempty_iUnion : (⋃ i, s i).Nonempty ↔ ∃ i, (s i).Nonempty := by simp [nonempty_iff_ne_empty] #align set.nonempty_Union Set.nonempty_iUnion -- Porting note (#10618): removing `simp`. `simp` can prove it theorem nonempty_biUnion {t : Set α} {s : α → Set β} : (⋃ i ∈ t, s i).Nonempty ↔ ∃ i ∈ t, (s i).Nonempty := by simp #align set.nonempty_bUnion Set.nonempty_biUnion theorem iUnion_nonempty_index (s : Set α) (t : s.Nonempty → Set β) : ⋃ h, t h = ⋃ x ∈ s, t ⟨x, ‹_›⟩ := iSup_exists #align set.Union_nonempty_index Set.iUnion_nonempty_index end @[simp] theorem iInter_iInter_eq_left {b : β} {s : ∀ x : β, x = b → Set α} : ⋂ (x) (h : x = b), s x h = s b rfl := iInf_iInf_eq_left #align set.Inter_Inter_eq_left Set.iInter_iInter_eq_left @[simp] theorem iInter_iInter_eq_right {b : β} {s : ∀ x : β, b = x → Set α} : ⋂ (x) (h : b = x), s x h = s b rfl := iInf_iInf_eq_right #align set.Inter_Inter_eq_right Set.iInter_iInter_eq_right @[simp] theorem iUnion_iUnion_eq_left {b : β} {s : ∀ x : β, x = b → Set α} : ⋃ (x) (h : x = b), s x h = s b rfl := iSup_iSup_eq_left #align set.Union_Union_eq_left Set.iUnion_iUnion_eq_left @[simp] theorem iUnion_iUnion_eq_right {b : β} {s : ∀ x : β, b = x → Set α} : ⋃ (x) (h : b = x), s x h = s b rfl := iSup_iSup_eq_right #align set.Union_Union_eq_right Set.iUnion_iUnion_eq_right theorem iInter_or {p q : Prop} (s : p ∨ q → Set α) : ⋂ h, s h = (⋂ h : p, s (Or.inl h)) ∩ ⋂ h : q, s (Or.inr h) := iInf_or #align set.Inter_or Set.iInter_or theorem iUnion_or {p q : Prop} (s : p ∨ q → Set α) : ⋃ h, s h = (⋃ i, s (Or.inl i)) ∪ ⋃ j, s (Or.inr j) := iSup_or #align set.Union_or Set.iUnion_or theorem iUnion_and {p q : Prop} (s : p ∧ q → Set α) : ⋃ h, s h = ⋃ (hp) (hq), s ⟨hp, hq⟩ := iSup_and #align set.Union_and Set.iUnion_and theorem iInter_and {p q : Prop} (s : p ∧ q → Set α) : ⋂ h, s h = ⋂ (hp) (hq), s ⟨hp, hq⟩ := iInf_and #align set.Inter_and Set.iInter_and theorem iUnion_comm (s : ι → ι' → Set α) : ⋃ (i) (i'), s i i' = ⋃ (i') (i), s i i' := iSup_comm #align set.Union_comm Set.iUnion_comm theorem iInter_comm (s : ι → ι' → Set α) : ⋂ (i) (i'), s i i' = ⋂ (i') (i), s i i' := iInf_comm #align set.Inter_comm Set.iInter_comm theorem iUnion_sigma {γ : α → Type} (s : Sigma γ → Set β) : ⋃ ia, s ia = ⋃ i, ⋃ a, s ⟨i, a⟩ := iSup_sigma theorem iUnion_sigma' {γ : α → Type} (s : ∀ i, γ i → Set β) : ⋃ i, ⋃ a, s i a = ⋃ ia : Sigma γ, s ia.1 ia.2 := iSup_sigma' _ theorem iInter_sigma {γ : α → Type} (s : Sigma γ → Set β) : ⋂ ia, s ia = ⋂ i, ⋂ a, s ⟨i, a⟩ := iInf_sigma theorem iInter_sigma' {γ : α → Type} (s : ∀ i, γ i → Set β) : ⋂ i, ⋂ a, s i a = ⋂ ia : Sigma γ, s ia.1 ia.2 := iInf_sigma' _ theorem iUnion₂_comm (s : ∀ i₁, κ₁ i₁ → ∀ i₂, κ₂ i₂ → Set α) : ⋃ (i₁) (j₁) (i₂) (j₂), s i₁ j₁ i₂ j₂ = ⋃ (i₂) (j₂) (i₁) (j₁), s i₁ j₁ i₂ j₂ := iSup₂_comm _ #align set.Union₂_comm Set.iUnion₂_comm theorem iInter₂_comm (s : ∀ i₁, κ₁ i₁ → ∀ i₂, κ₂ i₂ → Set α) : ⋂ (i₁) (j₁) (i₂) (j₂), s i₁ j₁ i₂ j₂ = ⋂ (i₂) (j₂) (i₁) (j₁), s i₁ j₁ i₂ j₂ := iInf₂_comm _ #align set.Inter₂_comm Set.iInter₂_comm @[simp] theorem biUnion_and (p : ι → Prop) (q : ι → ι' → Prop) (s : ∀ x y, p x ∧ q x y → Set α) : ⋃ (x : ι) (y : ι') (h : p x ∧ q x y), s x y h = ⋃ (x : ι) (hx : p x) (y : ι') (hy : q x y), s x y ⟨hx, hy⟩ := by simp only [iUnion_and, @iUnion_comm _ ι'] #align set.bUnion_and Set.biUnion_and @[simp] theorem biUnion_and' (p : ι' → Prop) (q : ι → ι' → Prop) (s : ∀ x y, p y ∧ q x y → Set α) : ⋃ (x : ι) (y : ι') (h : p y ∧ q x y), s x y h = ⋃ (y : ι') (hy : p y) (x : ι) (hx : q x y), s x y ⟨hy, hx⟩ := by simp only [iUnion_and, @iUnion_comm _ ι] #align set.bUnion_and' Set.biUnion_and' @[simp] theorem biInter_and (p : ι → Prop) (q : ι → ι' → Prop) (s : ∀ x y, p x ∧ q x y → Set α) : ⋂ (x : ι) (y : ι') (h : p x ∧ q x y), s x y h = ⋂ (x : ι) (hx : p x) (y : ι') (hy : q x y), s x y ⟨hx, hy⟩ := by simp only [iInter_and, @iInter_comm _ ι'] #align set.bInter_and Set.biInter_and @[simp] theorem biInter_and' (p : ι' → Prop) (q : ι → ι' → Prop) (s : ∀ x y, p y ∧ q x y → Set α) : ⋂ (x : ι) (y : ι') (h : p y ∧ q x y), s x y h = ⋂ (y : ι') (hy : p y) (x : ι) (hx : q x y), s x y ⟨hy, hx⟩ := by simp only [iInter_and, @iInter_comm _ ι] #align set.bInter_and' Set.biInter_and' @[simp] theorem iUnion_iUnion_eq_or_left {b : β} {p : β → Prop} {s : ∀ x : β, x = b ∨ p x → Set α} : ⋃ (x) (h), s x h = s b (Or.inl rfl) ∪ ⋃ (x) (h : p x), s x (Or.inr h) := by simp only [iUnion_or, iUnion_union_distrib, iUnion_iUnion_eq_left] #align set.Union_Union_eq_or_left Set.iUnion_iUnion_eq_or_left @[simp] theorem iInter_iInter_eq_or_left {b : β} {p : β → Prop} {s : ∀ x : β, x = b ∨ p x → Set α} : ⋂ (x) (h), s x h = s b (Or.inl rfl) ∩ ⋂ (x) (h : p x), s x (Or.inr h) := by simp only [iInter_or, iInter_inter_distrib, iInter_iInter_eq_left] #align set.Inter_Inter_eq_or_left Set.iInter_iInter_eq_or_left theorem mem_biUnion {s : Set α} {t : α → Set β} {x : α} {y : β} (xs : x ∈ s) (ytx : y ∈ t x) : y ∈ ⋃ x ∈ s, t x := mem_iUnion₂_of_mem xs ytx #align set.mem_bUnion Set.mem_biUnion theorem mem_biInter {s : Set α} {t : α → Set β} {y : β} (h : ∀ x ∈ s, y ∈ t x) : y ∈ ⋂ x ∈ s, t x := mem_iInter₂_of_mem h #align set.mem_bInter Set.mem_biInter theorem subset_biUnion_of_mem {s : Set α} {u : α → Set β} {x : α} (xs : x ∈ s) : u x ⊆ ⋃ x ∈ s, u x := -- Porting note: Why is this not just `subset_iUnion₂ x xs`? @subset_iUnion₂ β α (· ∈ s) (fun i _ => u i) x xs #align set.subset_bUnion_of_mem Set.subset_biUnion_of_mem theorem biInter_subset_of_mem {s : Set α} {t : α → Set β} {x : α} (xs : x ∈ s) : ⋂ x ∈ s, t x ⊆ t x := iInter₂_subset x xs #align set.bInter_subset_of_mem Set.biInter_subset_of_mem theorem biUnion_subset_biUnion_left {s s' : Set α} {t : α → Set β} (h : s ⊆ s') : ⋃ x ∈ s, t x ⊆ ⋃ x ∈ s', t x := iUnion₂_subset fun _ hx => subset_biUnion_of_mem <\| h hx #align set.bUnion_subset_bUnion_left Set.biUnion_subset_biUnion_left theorem biInter_subset_biInter_left {s s' : Set α} {t : α → Set β} (h : s' ⊆ s) : ⋂ x ∈ s, t x ⊆ ⋂ x ∈ s', t x := subset_iInter₂ fun _ hx => biInter_subset_of_mem <\| h hx #align set.bInter_subset_bInter_left Set.biInter_subset_biInter_left theorem biUnion_mono {s s' : Set α} {t t' : α → Set β} (hs : s' ⊆ s) (h : ∀ x ∈ s, t x ⊆ t' x) : ⋃ x ∈ s', t x ⊆ ⋃ x ∈ s, t' x := (biUnion_subset_biUnion_left hs).trans <\| iUnion₂_mono h #align set.bUnion_mono Set.biUnion_mono theorem biInter_mono {s s' : Set α} {t t' : α → Set β} (hs : s ⊆ s') (h : ∀ x ∈ s, t x ⊆ t' x) : ⋂ x ∈ s', t x ⊆ ⋂ x ∈ s, t' x := (biInter_subset_biInter_left hs).trans <\| iInter₂_mono h #align set.bInter_mono Set.biInter_mono theorem biUnion_eq_iUnion (s : Set α) (t : ∀ x ∈ s, Set β) : ⋃ x ∈ s, t x ‹_› = ⋃ x : s, t x x.2 := iSup_subtype' #align set.bUnion_eq_Union Set.biUnion_eq_iUnion theorem biInter_eq_iInter (s : Set α) (t : ∀ x ∈ s, Set β) : ⋂ x ∈ s, t x ‹_› = ⋂ x : s, t x x.2 := iInf_subtype' #align set.bInter_eq_Inter Set.biInter_eq_iInter theorem iUnion_subtype (p : α → Prop) (s : { x // p x } → Set β) : ⋃ x : { x // p x }, s x = ⋃ (x) (hx : p x), s ⟨x, hx⟩ := iSup_subtype #align set.Union_subtype Set.iUnion_subtype theorem iInter_subtype (p : α → Prop) (s : { x // p x } → Set β) : ⋂ x : { x // p x }, s x = ⋂ (x) (hx : p x), s ⟨x, hx⟩ := iInf_subtype #align set.Inter_subtype Set.iInter_subtype theorem biInter_empty (u : α → Set β) : ⋂ x ∈ (∅ : Set α), u x = univ := iInf_emptyset #align set.bInter_empty Set.biInter_empty theorem biInter_univ (u : α → Set β) : ⋂ x ∈ @univ α, u x = ⋂ x, u x := iInf_univ #align set.bInter_univ Set.biInter_univ @[simp] theorem biUnion_self (s : Set α) : ⋃ x ∈ s, s = s := Subset.antisymm (iUnion₂_subset fun _ _ => Subset.refl s) fun _ hx => mem_biUnion hx hx #align set.bUnion_self Set.biUnion_self @[simp] theorem iUnion_nonempty_self (s : Set α) : ⋃ _ : s.Nonempty, s = s := by rw [iUnion_nonempty_index, biUnion_self] #align set.Union_nonempty_self Set.iUnion_nonempty_self theorem biInter_singleton (a : α) (s : α → Set β) : ⋂ x ∈ ({a} : Set α), s x = s a := iInf_singleton #align set.bInter_singleton Set.biInter_singleton theorem biInter_union (s t : Set α) (u : α → Set β) : ⋂ x ∈ s ∪ t, u x = (⋂ x ∈ s, u x) ∩ ⋂ x ∈ t, u x := iInf_union #align set.bInter_union Set.biInter_union theorem biInter_insert (a : α) (s : Set α) (t : α → Set β) : ⋂ x ∈ insert a s, t x = t a ∩ ⋂ x ∈ s, t x := by simp #align set.bInter_insert Set.biInter_insert theorem biInter_pair (a b : α) (s : α → Set β) : ⋂ x ∈ ({a, b} : Set α), s x = s a ∩ s b := by rw [biInter_insert, biInter_singleton] #align set.bInter_pair Set.biInter_pair theorem biInter_inter {ι α : Type} {s : Set ι} (hs : s.Nonempty) (f : ι → Set α) (t : Set α) : ⋂ i ∈ s, f i ∩ t = (⋂ i ∈ s, f i) ∩ t := by haveI : Nonempty s := hs.to_subtype simp [biInter_eq_iInter, ← iInter_inter] #align set.bInter_inter Set.biInter_inter theorem inter_biInter {ι α : Type} {s : Set ι} (hs : s.Nonempty) (f : ι → Set α) (t : Set α) : ⋂ i ∈ s, t ∩ f i = t ∩ ⋂ i ∈ s, f i := by rw [inter_comm, ← biInter_inter hs] simp [inter_comm] #align set.inter_bInter Set.inter_biInter theorem biUnion_empty (s : α → Set β) : ⋃ x ∈ (∅ : Set α), s x = ∅ := iSup_emptyset #align set.bUnion_empty Set.biUnion_empty theorem biUnion_univ (s : α → Set β) : ⋃ x ∈ @univ α, s x = ⋃ x, s x := iSup_univ #align set.bUnion_univ Set.biUnion_univ theorem biUnion_singleton (a : α) (s : α → Set β) : ⋃ x ∈ ({a} : Set α), s x = s a := iSup_singleton #align set.bUnion_singleton Set.biUnion_singleton @[simp] theorem biUnion_of_singleton (s : Set α) : ⋃ x ∈ s, {x} = s := ext <\| by simp #align set.bUnion_of_singleton Set.biUnion_of_singleton theorem biUnion_union (s t : Set α) (u : α → Set β) : ⋃ x ∈ s ∪ t, u x = (⋃ x ∈ s, u x) ∪ ⋃ x ∈ t, u x := iSup_union #align set.bUnion_union Set.biUnion_union @[simp] theorem iUnion_coe_set {α β : Type} (s : Set α) (f : s → Set β) : ⋃ i, f i = ⋃ i ∈ s, f ⟨i, ‹i ∈ s›⟩ := iUnion_subtype _ _ #align set.Union_coe_set Set.iUnion_coe_set @[simp] theorem iInter_coe_set {α β : Type} (s : Set α) (f : s → Set β) : ⋂ i, f i = ⋂ i ∈ s, f ⟨i, ‹i ∈ s›⟩ := iInter_subtype _ _ #align set.Inter_coe_set Set.iInter_coe_set theorem biUnion_insert (a : α) (s : Set α) (t : α → Set β) : ⋃ x ∈ insert a s, t x = t a ∪ ⋃ x ∈ s, t x := by simp #align set.bUnion_insert Set.biUnion_insert theorem biUnion_pair (a b : α) (s : α → Set β) : ⋃ x ∈ ({a, b} : Set α), s x = s a ∪ s b := by simp #align set.bUnion_pair Set.biUnion_pair theorem inter_iUnion₂ (s : Set α) (t : ∀ i, κ i → Set α) : (s ∩ ⋃ (i) (j), t i j) = ⋃ (i) (j), s ∩ t i j := by simp only [inter_iUnion] #align set.inter_Union₂ Set.inter_iUnion₂ theorem iUnion₂_inter (s : ∀ i, κ i → Set α) (t : Set α) : (⋃ (i) (j), s i j) ∩ t = ⋃ (i) (j), s i j ∩ t := by simp_rw [iUnion_inter] #align set.Union₂_inter Set.iUnion₂_inter theorem union_iInter₂ (s : Set α) (t : ∀ i, κ i → Set α) : (s ∪ ⋂ (i) (j), t i j) = ⋂ (i) (j), s ∪ t i j := by simp_rw [union_iInter] #align set.union_Inter₂ Set.union_iInter₂ theorem iInter₂_union (s : ∀ i, κ i → Set α) (t : Set α) : (⋂ (i) (j), s i j) ∪ t = ⋂ (i) (j), s i j ∪ t := by simp_rw [iInter_union] #align set.Inter₂_union Set.iInter₂_union theorem mem_sUnion_of_mem {x : α} {t : Set α} {S : Set (Set α)} (hx : x ∈ t) (ht : t ∈ S) : x ∈ ⋃₀S := ⟨t, ht, hx⟩ #align set.mem_sUnion_of_mem Set.mem_sUnion_of_mem -- is this theorem really necessary? theorem not_mem_of_not_mem_sUnion {x : α} {t : Set α} {S : Set (Set α)} (hx : x ∉ ⋃₀S) (ht : t ∈ S) : x ∉ t := fun h => hx ⟨t, ht, h⟩ #align set.not_mem_of_not_mem_sUnion Set.not_mem_of_not_mem_sUnion theorem sInter_subset_of_mem {S : Set (Set α)} {t : Set α} (tS : t ∈ S) : ⋂₀ S ⊆ t := sInf_le tS #align set.sInter_subset_of_mem Set.sInter_subset_of_mem theorem subset_sUnion_of_mem {S : Set (Set α)} {t : Set α} (tS : t ∈ S) : t ⊆ ⋃₀S := le_sSup tS #align set.subset_sUnion_of_mem Set.subset_sUnion_of_mem theorem subset_sUnion_of_subset {s : Set α} (t : Set (Set α)) (u : Set α) (h₁ : s ⊆ u) (h₂ : u ∈ t) : s ⊆ ⋃₀t := Subset.trans h₁ (subset_sUnion_of_mem h₂) #align set.subset_sUnion_of_subset Set.subset_sUnion_of_subset theorem sUnion_subset {S : Set (Set α)} {t : Set α} (h : ∀ t' ∈ S, t' ⊆ t) : ⋃₀S ⊆ t := sSup_le h #align set.sUnion_subset Set.sUnion_subset @[simp] theorem sUnion_subset_iff {s : Set (Set α)} {t : Set α} : ⋃₀s ⊆ t ↔ ∀ t' ∈ s, t' ⊆ t := sSup_le_iff #align set.sUnion_subset_iff Set.sUnion_subset_iff lemma sUnion_mono_subsets {s : Set (Set α)} {f : Set α → Set α} (hf : ∀ t : Set α, t ⊆ f t) : ⋃₀ s ⊆ ⋃₀ (f '' s) := fun _ ⟨t, htx, hxt⟩ ↦ ⟨f t, mem_image_of_mem f htx, hf t hxt⟩ lemma sUnion_mono_supsets {s : Set (Set α)} {f : Set α → Set α} (hf : ∀ t : Set α, f t ⊆ t) : ⋃₀ (f '' s) ⊆ ⋃₀ s := -- If t ∈ f '' s is arbitrary; t = f u for some u : Set α. fun _ ⟨_, ⟨u, hus, hut⟩, hxt⟩ ↦ ⟨u, hus, (hut ▸ hf u) hxt⟩ theorem subset_sInter {S : Set (Set α)} {t : Set α} (h : ∀ t' ∈ S, t ⊆ t') : t ⊆ ⋂₀ S := le_sInf h #align set.subset_sInter Set.subset_sInter @[simp] theorem subset_sInter_iff {S : Set (Set α)} {t : Set α} : t ⊆ ⋂₀ S ↔ ∀ t' ∈ S, t ⊆ t' := le_sInf_iff #align set.subset_sInter_iff Set.subset_sInter_iff @[gcongr] theorem sUnion_subset_sUnion {S T : Set (Set α)} (h : S ⊆ T) : ⋃₀S ⊆ ⋃₀T := sUnion_subset fun _ hs => subset_sUnion_of_mem (h hs) #align set.sUnion_subset_sUnion Set.sUnion_subset_sUnion @[gcongr] theorem sInter_subset_sInter {S T : Set (Set α)} (h : S ⊆ T) : ⋂₀ T ⊆ ⋂₀ S := subset_sInter fun _ hs => sInter_subset_of_mem (h hs) #align set.sInter_subset_sInter Set.sInter_subset_sInter @[simp] theorem sUnion_empty : ⋃₀∅ = (∅ : Set α) := sSup_empty #align set.sUnion_empty Set.sUnion_empty @[simp] theorem sInter_empty : ⋂₀ ∅ = (univ : Set α) := sInf_empty #align set.sInter_empty Set.sInter_empty @[simp] theorem sUnion_singleton (s : Set α) : ⋃₀{s} = s := sSup_singleton #align set.sUnion_singleton Set.sUnion_singleton @[simp] theorem sInter_singleton (s : Set α) : ⋂₀ {s} = s := sInf_singleton #align set.sInter_singleton Set.sInter_singleton @[simp] theorem sUnion_eq_empty {S : Set (Set α)} : ⋃₀S = ∅ ↔ ∀ s ∈ S, s = ∅ := sSup_eq_bot #align set.sUnion_eq_empty Set.sUnion_eq_empty @[simp] theorem sInter_eq_univ {S : Set (Set α)} : ⋂₀ S = univ ↔ ∀ s ∈ S, s = univ := sInf_eq_top #align set.sInter_eq_univ Set.sInter_eq_univ theorem subset_powerset_iff {s : Set (Set α)} {t : Set α} : s ⊆ 𝒫 t ↔ ⋃₀ s ⊆ t := sUnion_subset_iff.symm theorem sUnion_powerset_gc : GaloisConnection (⋃₀ · : Set (Set α) → Set α) (𝒫 · : Set α → Set (Set α)) := gc_sSup_Iic def sUnion_powerset_gi : GaloisInsertion (⋃₀ · : Set (Set α) → Set α) (𝒫 · : Set α → Set (Set α)) := gi_sSup_Iic theorem sUnion_mem_empty_univ {S : Set (Set α)} (h : S ⊆ {∅, univ}) : ⋃₀ S ∈ ({∅, univ} : Set (Set α)) := by simp only [mem_insert_iff, mem_singleton_iff, or_iff_not_imp_left, sUnion_eq_empty, not_forall] rintro ⟨s, hs, hne⟩ obtain rfl : s = univ := (h hs).resolve_left hne exact univ_subset_iff.1 <\| subset_sUnion_of_mem hs @[simp] theorem nonempty_sUnion {S : Set (Set α)} : (⋃₀S).Nonempty ↔ ∃ s ∈ S, Set.Nonempty s := by simp [nonempty_iff_ne_empty] #align set.nonempty_sUnion Set.nonempty_sUnion theorem Nonempty.of_sUnion {s : Set (Set α)} (h : (⋃₀s).Nonempty) : s.Nonempty := let ⟨s, hs, _⟩ := nonempty_sUnion.1 h ⟨s, hs⟩ #align set.nonempty.of_sUnion Set.Nonempty.of_sUnion theorem Nonempty.of_sUnion_eq_univ [Nonempty α] {s : Set (Set α)} (h : ⋃₀s = univ) : s.Nonempty := Nonempty.of_sUnion <\| h.symm ▸ univ_nonempty #align set.nonempty.of_sUnion_eq_univ Set.Nonempty.of_sUnion_eq_univ theorem sUnion_union (S T : Set (Set α)) : ⋃₀(S ∪ T) = ⋃₀S ∪ ⋃₀T := sSup_union #align set.sUnion_union Set.sUnion_union theorem sInter_union (S T : Set (Set α)) : ⋂₀ (S ∪ T) = ⋂₀ S ∩ ⋂₀ T := sInf_union #align set.sInter_union Set.sInter_union @[simp] theorem sUnion_insert (s : Set α) (T : Set (Set α)) : ⋃₀insert s T = s ∪ ⋃₀T := sSup_insert #align set.sUnion_insert Set.sUnion_insert @[simp] theorem sInter_insert (s : Set α) (T : Set (Set α)) : ⋂₀ insert s T = s ∩ ⋂₀ T := sInf_insert #align set.sInter_insert Set.sInter_insert @[simp] theorem sUnion_diff_singleton_empty (s : Set (Set α)) : ⋃₀(s \ {∅}) = ⋃₀s := sSup_diff_singleton_bot s #align set.sUnion_diff_singleton_empty Set.sUnion_diff_singleton_empty @[simp] theorem sInter_diff_singleton_univ (s : Set (Set α)) : ⋂₀ (s \ {univ}) = ⋂₀ s := sInf_diff_singleton_top s #align set.sInter_diff_singleton_univ Set.sInter_diff_singleton_univ theorem sUnion_pair (s t : Set α) : ⋃₀{s, t} = s ∪ t := sSup_pair #align set.sUnion_pair Set.sUnion_pair theorem sInter_pair (s t : Set α) : ⋂₀ {s, t} = s ∩ t := sInf_pair #align set.sInter_pair Set.sInter_pair @[simp] theorem sUnion_image (f : α → Set β) (s : Set α) : ⋃₀(f '' s) = ⋃ x ∈ s, f x := sSup_image #align set.sUnion_image Set.sUnion_image @[simp] theorem sInter_image (f : α → Set β) (s : Set α) : ⋂₀ (f '' s) = ⋂ x ∈ s, f x := sInf_image #align set.sInter_image Set.sInter_image @[simp] theorem sUnion_range (f : ι → Set β) : ⋃₀range f = ⋃ x, f x := rfl #align set.sUnion_range Set.sUnion_range @[simp] theorem sInter_range (f : ι → Set β) : ⋂₀ range f = ⋂ x, f x := rfl #align set.sInter_range Set.sInter_range theorem iUnion_eq_univ_iff {f : ι → Set α} : ⋃ i, f i = univ ↔ ∀ x, ∃ i, x ∈ f i := by simp only [eq_univ_iff_forall, mem_iUnion] #align set.Union_eq_univ_iff Set.iUnion_eq_univ_iff theorem iUnion₂_eq_univ_iff {s : ∀ i, κ i → Set α} : ⋃ (i) (j), s i j = univ ↔ ∀ a, ∃ i j, a ∈ s i j := by simp only [iUnion_eq_univ_iff, mem_iUnion] #align set.Union₂_eq_univ_iff Set.iUnion₂_eq_univ_iff theorem sUnion_eq_univ_iff {c : Set (Set α)} : ⋃₀c = univ ↔ ∀ a, ∃ b ∈ c, a ∈ b := by simp only [eq_univ_iff_forall, mem_sUnion] #align set.sUnion_eq_univ_iff Set.sUnion_eq_univ_iff -- classical theorem iInter_eq_empty_iff {f : ι → Set α} : ⋂ i, f i = ∅ ↔ ∀ x, ∃ i, x ∉ f i := by simp [Set.eq_empty_iff_forall_not_mem] #align set.Inter_eq_empty_iff Set.iInter_eq_empty_iff -- classical theorem iInter₂_eq_empty_iff {s : ∀ i, κ i → Set α} : ⋂ (i) (j), s i j = ∅ ↔ ∀ a, ∃ i j, a ∉ s i j := by simp only [eq_empty_iff_forall_not_mem, mem_iInter, not_forall] #align set.Inter₂_eq_empty_iff Set.iInter₂_eq_empty_iff -- classical theorem sInter_eq_empty_iff {c : Set (Set α)} : ⋂₀ c = ∅ ↔ ∀ a, ∃ b ∈ c, a ∉ b := by simp [Set.eq_empty_iff_forall_not_mem] #align set.sInter_eq_empty_iff Set.sInter_eq_empty_iff -- classical @[simp] theorem nonempty_iInter {f : ι → Set α} : (⋂ i, f i).Nonempty ↔ ∃ x, ∀ i, x ∈ f i := by simp [nonempty_iff_ne_empty, iInter_eq_empty_iff] #align set.nonempty_Inter Set.nonempty_iInter -- classical -- Porting note (#10618): removing `simp`. `simp` can prove it theorem nonempty_iInter₂ {s : ∀ i, κ i → Set α} : (⋂ (i) (j), s i j).Nonempty ↔ ∃ a, ∀ i j, a ∈ s i j := by simp #align set.nonempty_Inter₂ Set.nonempty_iInter₂ -- classical @[simp] theorem nonempty_sInter {c : Set (Set α)} : (⋂₀ c).Nonempty ↔ ∃ a, ∀ b ∈ c, a ∈ b := by simp [nonempty_iff_ne_empty, sInter_eq_empty_iff] #align set.nonempty_sInter Set.nonempty_sInter -- classical theorem compl_sUnion (S : Set (Set α)) : (⋃₀S)ᶜ = ⋂₀ (compl '' S) := ext fun x => by simp #align set.compl_sUnion Set.compl_sUnion -- classical theorem sUnion_eq_compl_sInter_compl (S : Set (Set α)) : ⋃₀S = (⋂₀ (compl '' S))ᶜ := by rw [← compl_compl (⋃₀S), compl_sUnion] #align set.sUnion_eq_compl_sInter_compl Set.sUnion_eq_compl_sInter_compl -- classical	Mathlib/Data/Set/Lattice.lean	1,240	1,241	theorem compl_sInter (S : Set (Set α)) : (⋂₀ S)ᶜ = ⋃₀(compl '' S) := by	rw [sUnion_eq_compl_sInter_compl, compl_compl_image]
import Mathlib.Algebra.Order.Monoid.Unbundled.Pow import Mathlib.Data.Finset.Fold import Mathlib.Data.Finset.Option import Mathlib.Data.Finset.Pi import Mathlib.Data.Finset.Prod import Mathlib.Data.Multiset.Lattice import Mathlib.Data.Set.Lattice import Mathlib.Order.Hom.Lattice import Mathlib.Order.Nat #align_import data.finset.lattice from "leanprover-community/mathlib"@"442a83d738cb208d3600056c489be16900ba701d" -- TODO: -- assert_not_exists OrderedCommMonoid assert_not_exists MonoidWithZero open Function Multiset OrderDual variable {F α β γ ι κ : Type*} namespace Finset section Sup -- TODO: define with just `[Bot α]` where some lemmas hold without requiring `[OrderBot α]` variable [SemilatticeSup α] [OrderBot α] def sup (s : Finset β) (f : β → α) : α := s.fold (· ⊔ ·) ⊥ f #align finset.sup Finset.sup variable {s s₁ s₂ : Finset β} {f g : β → α} {a : α} theorem sup_def : s.sup f = (s.1.map f).sup := rfl #align finset.sup_def Finset.sup_def @[simp] theorem sup_empty : (∅ : Finset β).sup f = ⊥ := fold_empty #align finset.sup_empty Finset.sup_empty @[simp] theorem sup_cons {b : β} (h : b ∉ s) : (cons b s h).sup f = f b ⊔ s.sup f := fold_cons h #align finset.sup_cons Finset.sup_cons @[simp] theorem sup_insert [DecidableEq β] {b : β} : (insert b s : Finset β).sup f = f b ⊔ s.sup f := fold_insert_idem #align finset.sup_insert Finset.sup_insert @[simp] theorem sup_image [DecidableEq β] (s : Finset γ) (f : γ → β) (g : β → α) : (s.image f).sup g = s.sup (g ∘ f) := fold_image_idem #align finset.sup_image Finset.sup_image @[simp] theorem sup_map (s : Finset γ) (f : γ ↪ β) (g : β → α) : (s.map f).sup g = s.sup (g ∘ f) := fold_map #align finset.sup_map Finset.sup_map @[simp] theorem sup_singleton {b : β} : ({b} : Finset β).sup f = f b := Multiset.sup_singleton #align finset.sup_singleton Finset.sup_singleton theorem sup_sup : s.sup (f ⊔ g) = s.sup f ⊔ s.sup g := by induction s using Finset.cons_induction with \| empty => rw [sup_empty, sup_empty, sup_empty, bot_sup_eq] \| cons _ _ _ ih => rw [sup_cons, sup_cons, sup_cons, ih] exact sup_sup_sup_comm _ _ _ _ #align finset.sup_sup Finset.sup_sup theorem sup_congr {f g : β → α} (hs : s₁ = s₂) (hfg : ∀ a ∈ s₂, f a = g a) : s₁.sup f = s₂.sup g := by subst hs exact Finset.fold_congr hfg #align finset.sup_congr Finset.sup_congr @[simp] theorem _root_.map_finset_sup [SemilatticeSup β] [OrderBot β] [FunLike F α β] [SupBotHomClass F α β] (f : F) (s : Finset ι) (g : ι → α) : f (s.sup g) = s.sup (f ∘ g) := Finset.cons_induction_on s (map_bot f) fun i s _ h => by rw [sup_cons, sup_cons, map_sup, h, Function.comp_apply] #align map_finset_sup map_finset_sup @[simp] protected theorem sup_le_iff {a : α} : s.sup f ≤ a ↔ ∀ b ∈ s, f b ≤ a := by apply Iff.trans Multiset.sup_le simp only [Multiset.mem_map, and_imp, exists_imp] exact ⟨fun k b hb => k _ _ hb rfl, fun k a' b hb h => h ▸ k _ hb⟩ #align finset.sup_le_iff Finset.sup_le_iff protected alias ⟨_, sup_le⟩ := Finset.sup_le_iff #align finset.sup_le Finset.sup_le theorem sup_const_le : (s.sup fun _ => a) ≤ a := Finset.sup_le fun _ _ => le_rfl #align finset.sup_const_le Finset.sup_const_le theorem le_sup {b : β} (hb : b ∈ s) : f b ≤ s.sup f := Finset.sup_le_iff.1 le_rfl _ hb #align finset.le_sup Finset.le_sup theorem le_sup_of_le {b : β} (hb : b ∈ s) (h : a ≤ f b) : a ≤ s.sup f := h.trans <\| le_sup hb #align finset.le_sup_of_le Finset.le_sup_of_le theorem sup_union [DecidableEq β] : (s₁ ∪ s₂).sup f = s₁.sup f ⊔ s₂.sup f := eq_of_forall_ge_iff fun c => by simp [or_imp, forall_and] #align finset.sup_union Finset.sup_union @[simp] theorem sup_biUnion [DecidableEq β] (s : Finset γ) (t : γ → Finset β) : (s.biUnion t).sup f = s.sup fun x => (t x).sup f := eq_of_forall_ge_iff fun c => by simp [@forall_swap _ β] #align finset.sup_bUnion Finset.sup_biUnion theorem sup_const {s : Finset β} (h : s.Nonempty) (c : α) : (s.sup fun _ => c) = c := eq_of_forall_ge_iff (fun _ => Finset.sup_le_iff.trans h.forall_const) #align finset.sup_const Finset.sup_const @[simp]	Mathlib/Data/Finset/Lattice.lean	140	143	theorem sup_bot (s : Finset β) : (s.sup fun _ => ⊥) = (⊥ : α) := by	obtain rfl \| hs := s.eq_empty_or_nonempty · exact sup_empty · exact sup_const hs _
import Mathlib.Algebra.BigOperators.Group.Finset import Mathlib.Algebra.Group.Submonoid.Basic import Mathlib.Deprecated.Group #align_import deprecated.submonoid from "leanprover-community/mathlib"@"509de852e1de55e1efa8eacfa11df0823f26f226" variable {M : Type} [Monoid M] {s : Set M} variable {A : Type} [AddMonoid A] {t : Set A} structure IsAddSubmonoid (s : Set A) : Prop where zero_mem : (0 : A) ∈ s add_mem {a b} : a ∈ s → b ∈ s → a + b ∈ s #align is_add_submonoid IsAddSubmonoid @[to_additive] structure IsSubmonoid (s : Set M) : Prop where one_mem : (1 : M) ∈ s mul_mem {a b} : a ∈ s → b ∈ s → a * b ∈ s #align is_submonoid IsSubmonoid theorem Additive.isAddSubmonoid {s : Set M} : IsSubmonoid s → @IsAddSubmonoid (Additive M) _ s \| ⟨h₁, h₂⟩ => ⟨h₁, @h₂⟩ #align additive.is_add_submonoid Additive.isAddSubmonoid theorem Additive.isAddSubmonoid_iff {s : Set M} : @IsAddSubmonoid (Additive M) _ s ↔ IsSubmonoid s := ⟨fun ⟨h₁, h₂⟩ => ⟨h₁, @h₂⟩, Additive.isAddSubmonoid⟩ #align additive.is_add_submonoid_iff Additive.isAddSubmonoid_iff theorem Multiplicative.isSubmonoid {s : Set A} : IsAddSubmonoid s → @IsSubmonoid (Multiplicative A) _ s \| ⟨h₁, h₂⟩ => ⟨h₁, @h₂⟩ #align multiplicative.is_submonoid Multiplicative.isSubmonoid theorem Multiplicative.isSubmonoid_iff {s : Set A} : @IsSubmonoid (Multiplicative A) _ s ↔ IsAddSubmonoid s := ⟨fun ⟨h₁, h₂⟩ => ⟨h₁, @h₂⟩, Multiplicative.isSubmonoid⟩ #align multiplicative.is_submonoid_iff Multiplicative.isSubmonoid_iff @[to_additive "The intersection of two `AddSubmonoid`s of an `AddMonoid` `M` is an `AddSubmonoid` of M."] theorem IsSubmonoid.inter {s₁ s₂ : Set M} (is₁ : IsSubmonoid s₁) (is₂ : IsSubmonoid s₂) : IsSubmonoid (s₁ ∩ s₂) := { one_mem := ⟨is₁.one_mem, is₂.one_mem⟩ mul_mem := @fun _ _ hx hy => ⟨is₁.mul_mem hx.1 hy.1, is₂.mul_mem hx.2 hy.2⟩ } #align is_submonoid.inter IsSubmonoid.inter #align is_add_submonoid.inter IsAddSubmonoid.inter @[to_additive "The intersection of an indexed set of `AddSubmonoid`s of an `AddMonoid` `M` is an `AddSubmonoid` of `M`."] theorem IsSubmonoid.iInter {ι : Sort} {s : ι → Set M} (h : ∀ y : ι, IsSubmonoid (s y)) : IsSubmonoid (Set.iInter s) := { one_mem := Set.mem_iInter.2 fun y => (h y).one_mem mul_mem := fun h₁ h₂ => Set.mem_iInter.2 fun y => (h y).mul_mem (Set.mem_iInter.1 h₁ y) (Set.mem_iInter.1 h₂ y) } #align is_submonoid.Inter IsSubmonoid.iInter #align is_add_submonoid.Inter IsAddSubmonoid.iInter @[to_additive "The union of an indexed, directed, nonempty set of `AddSubmonoid`s of an `AddMonoid` `M` is an `AddSubmonoid` of `M`. "] theorem isSubmonoid_iUnion_of_directed {ι : Type} [hι : Nonempty ι] {s : ι → Set M} (hs : ∀ i, IsSubmonoid (s i)) (Directed : ∀ i j, ∃ k, s i ⊆ s k ∧ s j ⊆ s k) : IsSubmonoid (⋃ i, s i) := { one_mem := let ⟨i⟩ := hι Set.mem_iUnion.2 ⟨i, (hs i).one_mem⟩ mul_mem := fun ha hb => let ⟨i, hi⟩ := Set.mem_iUnion.1 ha let ⟨j, hj⟩ := Set.mem_iUnion.1 hb let ⟨k, hk⟩ := Directed i j Set.mem_iUnion.2 ⟨k, (hs k).mul_mem (hk.1 hi) (hk.2 hj)⟩ } #align is_submonoid_Union_of_directed isSubmonoid_iUnion_of_directed #align is_add_submonoid_Union_of_directed isAddSubmonoid_iUnion_of_directed namespace IsSubmonoid @[to_additive "The sum of a list of elements of an `AddSubmonoid` is an element of the `AddSubmonoid`."] theorem list_prod_mem (hs : IsSubmonoid s) : ∀ {l : List M}, (∀ x ∈ l, x ∈ s) → l.prod ∈ s \| [], _ => hs.one_mem \| a :: l, h => suffices a * l.prod ∈ s by simpa have : a ∈ s ∧ ∀ x ∈ l, x ∈ s := by simpa using h hs.mul_mem this.1 (list_prod_mem hs this.2) #align is_submonoid.list_prod_mem IsSubmonoid.list_prod_mem #align is_add_submonoid.list_sum_mem IsAddSubmonoid.list_sum_mem @[to_additive "The sum of a multiset of elements of an `AddSubmonoid` of an `AddCommMonoid` is an element of the `AddSubmonoid`. "]	Mathlib/Deprecated/Submonoid.lean	246	250	theorem multiset_prod_mem {M} [CommMonoid M] {s : Set M} (hs : IsSubmonoid s) (m : Multiset M) : (∀ a ∈ m, a ∈ s) → m.prod ∈ s := by	refine Quotient.inductionOn m fun l hl => ?_ rw [Multiset.quot_mk_to_coe, Multiset.prod_coe] exact list_prod_mem hs hl
import Mathlib.Data.List.Basic namespace List variable {α β : Type*} #align list.length_enum_from List.enumFrom_length #align list.length_enum List.enum_length @[simp] theorem get?_enumFrom : ∀ n (l : List α) m, get? (enumFrom n l) m = (get? l m).map fun a => (n + m, a) \| n, [], m => rfl \| n, a :: l, 0 => rfl \| n, a :: l, m + 1 => (get?_enumFrom (n + 1) l m).trans <\| by rw [Nat.add_right_comm]; rfl #align list.enum_from_nth List.get?_enumFrom @[deprecated (since := "2024-04-06")] alias enumFrom_get? := get?_enumFrom @[simp] theorem get?_enum (l : List α) (n) : get? (enum l) n = (get? l n).map fun a => (n, a) := by rw [enum, get?_enumFrom, Nat.zero_add] #align list.enum_nth List.get?_enum @[deprecated (since := "2024-04-06")] alias enum_get? := get?_enum @[simp] theorem enumFrom_map_snd : ∀ (n) (l : List α), map Prod.snd (enumFrom n l) = l \| _, [] => rfl \| _, _ :: _ => congr_arg (cons _) (enumFrom_map_snd _ _) #align list.enum_from_map_snd List.enumFrom_map_snd @[simp] theorem enum_map_snd (l : List α) : map Prod.snd (enum l) = l := enumFrom_map_snd _ _ #align list.enum_map_snd List.enum_map_snd @[simp] theorem get_enumFrom (l : List α) (n) (i : Fin (l.enumFrom n).length) : (l.enumFrom n).get i = (n + i, l.get (i.cast enumFrom_length)) := by simp [get_eq_get?] #align list.nth_le_enum_from List.get_enumFrom @[simp] theorem get_enum (l : List α) (i : Fin l.enum.length) : l.enum.get i = (i.1, l.get (i.cast enum_length)) := by simp [enum] #align list.nth_le_enum List.get_enum theorem mk_add_mem_enumFrom_iff_get? {n i : ℕ} {x : α} {l : List α} : (n + i, x) ∈ enumFrom n l ↔ l.get? i = x := by simp [mem_iff_get?] theorem mk_mem_enumFrom_iff_le_and_get?_sub {n i : ℕ} {x : α} {l : List α} : (i, x) ∈ enumFrom n l ↔ n ≤ i ∧ l.get? (i - n) = x := by if h : n ≤ i then rcases Nat.exists_eq_add_of_le h with ⟨i, rfl⟩ simp [mk_add_mem_enumFrom_iff_get?, Nat.add_sub_cancel_left] else have : ∀ k, n + k ≠ i := by rintro k rfl; simp at h simp [h, mem_iff_get?, this] theorem mk_mem_enum_iff_get? {i : ℕ} {x : α} {l : List α} : (i, x) ∈ enum l ↔ l.get? i = x := by simp [enum, mk_mem_enumFrom_iff_le_and_get?_sub] theorem mem_enum_iff_get? {x : ℕ × α} {l : List α} : x ∈ enum l ↔ l.get? x.1 = x.2 := mk_mem_enum_iff_get? theorem le_fst_of_mem_enumFrom {x : ℕ × α} {n : ℕ} {l : List α} (h : x ∈ enumFrom n l) : n ≤ x.1 := (mk_mem_enumFrom_iff_le_and_get?_sub.1 h).1 theorem fst_lt_add_of_mem_enumFrom {x : ℕ × α} {n : ℕ} {l : List α} (h : x ∈ enumFrom n l) : x.1 < n + length l := by rcases mem_iff_get.1 h with ⟨i, rfl⟩ simpa using i.is_lt theorem fst_lt_of_mem_enum {x : ℕ × α} {l : List α} (h : x ∈ enum l) : x.1 < length l := by simpa using fst_lt_add_of_mem_enumFrom h theorem snd_mem_of_mem_enumFrom {x : ℕ × α} {n : ℕ} {l : List α} (h : x ∈ enumFrom n l) : x.2 ∈ l := enumFrom_map_snd n l ▸ mem_map_of_mem _ h theorem snd_mem_of_mem_enum {x : ℕ × α} {l : List α} (h : x ∈ enum l) : x.2 ∈ l := snd_mem_of_mem_enumFrom h theorem mem_enumFrom {x : α} {i j : ℕ} (xs : List α) (h : (i, x) ∈ xs.enumFrom j) : j ≤ i ∧ i < j + xs.length ∧ x ∈ xs := ⟨le_fst_of_mem_enumFrom h, fst_lt_add_of_mem_enumFrom h, snd_mem_of_mem_enumFrom h⟩ #align list.mem_enum_from List.mem_enumFrom @[simp] theorem enum_nil : enum ([] : List α) = [] := rfl #align list.enum_nil List.enum_nil #align list.enum_from_nil List.enumFrom_nil #align list.enum_from_cons List.enumFrom_cons @[simp] theorem enum_cons (x : α) (xs : List α) : enum (x :: xs) = (0, x) :: enumFrom 1 xs := rfl #align list.enum_cons List.enum_cons @[simp] theorem enumFrom_singleton (x : α) (n : ℕ) : enumFrom n [x] = [(n, x)] := rfl #align list.enum_from_singleton List.enumFrom_singleton @[simp] theorem enum_singleton (x : α) : enum [x] = [(0, x)] := rfl #align list.enum_singleton List.enum_singleton theorem enumFrom_append (xs ys : List α) (n : ℕ) : enumFrom n (xs ++ ys) = enumFrom n xs ++ enumFrom (n + xs.length) ys := by induction' xs with x xs IH generalizing ys n · simp · rw [cons_append, enumFrom_cons, IH, ← cons_append, ← enumFrom_cons, length, Nat.add_right_comm, Nat.add_assoc] #align list.enum_from_append List.enumFrom_append	Mathlib/Data/List/Enum.lean	132	133	theorem enum_append (xs ys : List α) : enum (xs ++ ys) = enum xs ++ enumFrom xs.length ys := by	simp [enum, enumFrom_append]
import Mathlib.AlgebraicTopology.DoldKan.PInfty #align_import algebraic_topology.dold_kan.decomposition from "leanprover-community/mathlib"@"32a7e535287f9c73f2e4d2aef306a39190f0b504" open CategoryTheory CategoryTheory.Category CategoryTheory.Preadditive Opposite Simplicial noncomputable section namespace AlgebraicTopology namespace DoldKan variable {C : Type*} [Category C] [Preadditive C] {X X' : SimplicialObject C}	Mathlib/AlgebraicTopology/DoldKan/Decomposition.lean	52	81	theorem decomposition_Q (n q : ℕ) : ((Q q).f (n + 1) : X _[n + 1] ⟶ X _[n + 1]) = ∑ i ∈ Finset.filter (fun i : Fin (n + 1) => (i : ℕ) < q) Finset.univ, (P i).f (n + 1) ≫ X.δ i.rev.succ ≫ X.σ (Fin.rev i) := by	induction' q with q hq · simp only [Nat.zero_eq, Q_zero, HomologicalComplex.zero_f_apply, Nat.not_lt_zero, Finset.filter_False, Finset.sum_empty] · by_cases hqn : q + 1 ≤ n + 1 swap · rw [Q_is_eventually_constant (show n + 1 ≤ q by omega), hq] congr 1 ext ⟨x, hx⟩ simp only [Nat.succ_eq_add_one, Finset.mem_filter, Finset.mem_univ, true_and] omega · cases' Nat.le.dest (Nat.succ_le_succ_iff.mp hqn) with a ha rw [Q_succ, HomologicalComplex.sub_f_apply, HomologicalComplex.comp_f, hq] symm conv_rhs => rw [sub_eq_add_neg, add_comm] let q' : Fin (n + 1) := ⟨q, Nat.succ_le_iff.mp hqn⟩ rw [← @Finset.add_sum_erase _ _ _ _ _ _ q' (by simp)] congr · have hnaq' : n = a + q := by omega simp only [Fin.val_mk, (HigherFacesVanish.of_P q n).comp_Hσ_eq hnaq', q'.rev_eq hnaq', neg_neg] rfl · ext ⟨i, hi⟩ simp only [q', Nat.succ_eq_add_one, Nat.lt_succ_iff_lt_or_eq, Finset.mem_univ, forall_true_left, Finset.mem_filter, lt_self_iff_false, or_true, and_self, not_true, Finset.mem_erase, ne_eq, Fin.mk.injEq, true_and] aesop
import Mathlib.Algebra.GroupWithZero.NonZeroDivisors import Mathlib.Algebra.Polynomial.Lifts import Mathlib.GroupTheory.MonoidLocalization import Mathlib.RingTheory.Algebraic import Mathlib.RingTheory.Ideal.LocalRing import Mathlib.RingTheory.IntegralClosure import Mathlib.RingTheory.Localization.FractionRing import Mathlib.RingTheory.Localization.Integer #align_import ring_theory.localization.integral from "leanprover-community/mathlib"@"831c494092374cfe9f50591ed0ac81a25efc5b86" variable {R : Type} [CommRing R] (M : Submonoid R) {S : Type} [CommRing S] variable [Algebra R S] {P : Type} [CommRing P] open Polynomial namespace IsLocalization section IntegerNormalization open Polynomial variable [IsLocalization M S] open scoped Classical noncomputable def coeffIntegerNormalization (p : S[X]) (i : ℕ) : R := if hi : i ∈ p.support then Classical.choose (Classical.choose_spec (exist_integer_multiples_of_finset M (p.support.image p.coeff)) (p.coeff i) (Finset.mem_image.mpr ⟨i, hi, rfl⟩)) else 0 #align is_localization.coeff_integer_normalization IsLocalization.coeffIntegerNormalization theorem coeffIntegerNormalization_of_not_mem_support (p : S[X]) (i : ℕ) (h : coeff p i = 0) : coeffIntegerNormalization M p i = 0 := by simp only [coeffIntegerNormalization, h, mem_support_iff, eq_self_iff_true, not_true, Ne, dif_neg, not_false_iff] #align is_localization.coeff_integer_normalization_of_not_mem_support IsLocalization.coeffIntegerNormalization_of_not_mem_support theorem coeffIntegerNormalization_mem_support (p : S[X]) (i : ℕ) (h : coeffIntegerNormalization M p i ≠ 0) : i ∈ p.support := by contrapose h rw [Ne, Classical.not_not, coeffIntegerNormalization, dif_neg h] #align is_localization.coeff_integer_normalization_mem_support IsLocalization.coeffIntegerNormalization_mem_support noncomputable def integerNormalization (p : S[X]) : R[X] := ∑ i ∈ p.support, monomial i (coeffIntegerNormalization M p i) #align is_localization.integer_normalization IsLocalization.integerNormalization @[simp] theorem integerNormalization_coeff (p : S[X]) (i : ℕ) : (integerNormalization M p).coeff i = coeffIntegerNormalization M p i := by simp (config := { contextual := true }) [integerNormalization, coeff_monomial, coeffIntegerNormalization_of_not_mem_support] #align is_localization.integer_normalization_coeff IsLocalization.integerNormalization_coeff theorem integerNormalization_spec (p : S[X]) : ∃ b : M, ∀ i, algebraMap R S ((integerNormalization M p).coeff i) = (b : R) • p.coeff i := by use Classical.choose (exist_integer_multiples_of_finset M (p.support.image p.coeff)) intro i rw [integerNormalization_coeff, coeffIntegerNormalization] split_ifs with hi · exact Classical.choose_spec (Classical.choose_spec (exist_integer_multiples_of_finset M (p.support.image p.coeff)) (p.coeff i) (Finset.mem_image.mpr ⟨i, hi, rfl⟩)) · rw [RingHom.map_zero, not_mem_support_iff.mp hi, smul_zero] -- Porting note: was `convert (smul_zero _).symm, ...` #align is_localization.integer_normalization_spec IsLocalization.integerNormalization_spec theorem integerNormalization_map_to_map (p : S[X]) : ∃ b : M, (integerNormalization M p).map (algebraMap R S) = (b : R) • p := let ⟨b, hb⟩ := integerNormalization_spec M p ⟨b, Polynomial.ext fun i => by rw [coeff_map, coeff_smul] exact hb i⟩ #align is_localization.integer_normalization_map_to_map IsLocalization.integerNormalization_map_to_map variable {R' : Type} [CommRing R'] theorem integerNormalization_eval₂_eq_zero (g : S →+* R') (p : S[X]) {x : R'} (hx : eval₂ g x p = 0) : eval₂ (g.comp (algebraMap R S)) x (integerNormalization M p) = 0 := let ⟨b, hb⟩ := integerNormalization_map_to_map M p _root_.trans (eval₂_map (algebraMap R S) g x).symm (by rw [hb, ← IsScalarTower.algebraMap_smul S (b : R) p, eval₂_smul, hx, mul_zero]) #align is_localization.integer_normalization_eval₂_eq_zero IsLocalization.integerNormalization_eval₂_eq_zero	Mathlib/RingTheory/Localization/Integral.lean	112	115	theorem integerNormalization_aeval_eq_zero [Algebra R R'] [Algebra S R'] [IsScalarTower R S R'] (p : S[X]) {x : R'} (hx : aeval x p = 0) : aeval x (integerNormalization M p) = 0 := by	rw [aeval_def, IsScalarTower.algebraMap_eq R S R', integerNormalization_eval₂_eq_zero _ (algebraMap _ _) _ hx]
import Mathlib.Geometry.Manifold.SmoothManifoldWithCorners import Mathlib.Geometry.Manifold.LocalInvariantProperties #align_import geometry.manifold.cont_mdiff from "leanprover-community/mathlib"@"e5ab837fc252451f3eb9124ae6e7b6f57455e7b9" open Set Function Filter ChartedSpace SmoothManifoldWithCorners open scoped Topology Manifold variable {𝕜 : Type} [NontriviallyNormedField 𝕜] -- declare a smooth manifold `M` over the pair `(E, H)`. {E : Type} [NormedAddCommGroup E] [NormedSpace 𝕜 E] {H : Type} [TopologicalSpace H] (I : ModelWithCorners 𝕜 E H) {M : Type} [TopologicalSpace M] [ChartedSpace H M] [SmoothManifoldWithCorners I M] -- declare a smooth manifold `M'` over the pair `(E', H')`. {E' : Type} [NormedAddCommGroup E'] [NormedSpace 𝕜 E'] {H' : Type} [TopologicalSpace H'] (I' : ModelWithCorners 𝕜 E' H') {M' : Type} [TopologicalSpace M'] [ChartedSpace H' M'] [SmoothManifoldWithCorners I' M'] -- declare a manifold `M''` over the pair `(E'', H'')`. {E'' : Type} [NormedAddCommGroup E''] [NormedSpace 𝕜 E''] {H'' : Type} [TopologicalSpace H''] {I'' : ModelWithCorners 𝕜 E'' H''} {M'' : Type} [TopologicalSpace M''] [ChartedSpace H'' M''] -- declare a smooth manifold `N` over the pair `(F, G)`. {F : Type} [NormedAddCommGroup F] [NormedSpace 𝕜 F] {G : Type} [TopologicalSpace G] {J : ModelWithCorners 𝕜 F G} {N : Type} [TopologicalSpace N] [ChartedSpace G N] [SmoothManifoldWithCorners J N] -- declare a smooth manifold `N'` over the pair `(F', G')`. {F' : Type} [NormedAddCommGroup F'] [NormedSpace 𝕜 F'] {G' : Type} [TopologicalSpace G'] {J' : ModelWithCorners 𝕜 F' G'} {N' : Type} [TopologicalSpace N'] [ChartedSpace G' N'] [SmoothManifoldWithCorners J' N'] -- F₁, F₂, F₃, F₄ are normed spaces {F₁ : Type} [NormedAddCommGroup F₁] [NormedSpace 𝕜 F₁] {F₂ : Type} [NormedAddCommGroup F₂] [NormedSpace 𝕜 F₂] {F₃ : Type} [NormedAddCommGroup F₃] [NormedSpace 𝕜 F₃] {F₄ : Type} [NormedAddCommGroup F₄] [NormedSpace 𝕜 F₄] -- declare functions, sets, points and smoothness indices {e : PartialHomeomorph M H} {e' : PartialHomeomorph M' H'} {f f₁ : M → M'} {s s₁ t : Set M} {x : M} {m n : ℕ∞} def ContDiffWithinAtProp (n : ℕ∞) (f : H → H') (s : Set H) (x : H) : Prop := ContDiffWithinAt 𝕜 n (I' ∘ f ∘ I.symm) (I.symm ⁻¹' s ∩ range I) (I x) #align cont_diff_within_at_prop ContDiffWithinAtProp theorem contDiffWithinAtProp_self_source {f : E → H'} {s : Set E} {x : E} : ContDiffWithinAtProp 𝓘(𝕜, E) I' n f s x ↔ ContDiffWithinAt 𝕜 n (I' ∘ f) s x := by simp_rw [ContDiffWithinAtProp, modelWithCornersSelf_coe, range_id, inter_univ, modelWithCornersSelf_coe_symm, CompTriple.comp_eq, preimage_id_eq, id_eq] #align cont_diff_within_at_prop_self_source contDiffWithinAtProp_self_source theorem contDiffWithinAtProp_self {f : E → E'} {s : Set E} {x : E} : ContDiffWithinAtProp 𝓘(𝕜, E) 𝓘(𝕜, E') n f s x ↔ ContDiffWithinAt 𝕜 n f s x := contDiffWithinAtProp_self_source 𝓘(𝕜, E') #align cont_diff_within_at_prop_self contDiffWithinAtProp_self theorem contDiffWithinAtProp_self_target {f : H → E'} {s : Set H} {x : H} : ContDiffWithinAtProp I 𝓘(𝕜, E') n f s x ↔ ContDiffWithinAt 𝕜 n (f ∘ I.symm) (I.symm ⁻¹' s ∩ range I) (I x) := Iff.rfl #align cont_diff_within_at_prop_self_target contDiffWithinAtProp_self_target theorem contDiffWithinAt_localInvariantProp (n : ℕ∞) : (contDiffGroupoid ∞ I).LocalInvariantProp (contDiffGroupoid ∞ I') (ContDiffWithinAtProp I I' n) where is_local {s x u f} u_open xu := by have : I.symm ⁻¹' (s ∩ u) ∩ range I = I.symm ⁻¹' s ∩ range I ∩ I.symm ⁻¹' u := by simp only [inter_right_comm, preimage_inter] rw [ContDiffWithinAtProp, ContDiffWithinAtProp, this] symm apply contDiffWithinAt_inter have : u ∈ 𝓝 (I.symm (I x)) := by rw [ModelWithCorners.left_inv] exact u_open.mem_nhds xu apply ContinuousAt.preimage_mem_nhds I.continuous_symm.continuousAt this right_invariance' {s x f e} he hx h := by rw [ContDiffWithinAtProp] at h ⊢ have : I x = (I ∘ e.symm ∘ I.symm) (I (e x)) := by simp only [hx, mfld_simps] rw [this] at h have : I (e x) ∈ I.symm ⁻¹' e.target ∩ range I := by simp only [hx, mfld_simps] have := (mem_groupoid_of_pregroupoid.2 he).2.contDiffWithinAt this convert (h.comp' _ (this.of_le le_top)).mono_of_mem _ using 1 · ext y; simp only [mfld_simps] refine mem_nhdsWithin.mpr ⟨I.symm ⁻¹' e.target, e.open_target.preimage I.continuous_symm, by simp_rw [mem_preimage, I.left_inv, e.mapsTo hx], ?_⟩ mfld_set_tac congr_of_forall {s x f g} h hx hf := by apply hf.congr · intro y hy simp only [mfld_simps] at hy simp only [h, hy, mfld_simps] · simp only [hx, mfld_simps] left_invariance' {s x f e'} he' hs hx h := by rw [ContDiffWithinAtProp] at h ⊢ have A : (I' ∘ f ∘ I.symm) (I x) ∈ I'.symm ⁻¹' e'.source ∩ range I' := by simp only [hx, mfld_simps] have := (mem_groupoid_of_pregroupoid.2 he').1.contDiffWithinAt A convert (this.of_le le_top).comp _ h _ · ext y; simp only [mfld_simps] · intro y hy; simp only [mfld_simps] at hy; simpa only [hy, mfld_simps] using hs hy.1 #align cont_diff_within_at_local_invariant_prop contDiffWithinAt_localInvariantProp theorem contDiffWithinAtProp_mono_of_mem (n : ℕ∞) ⦃s x t⦄ ⦃f : H → H'⦄ (hts : s ∈ 𝓝[t] x) (h : ContDiffWithinAtProp I I' n f s x) : ContDiffWithinAtProp I I' n f t x := by refine h.mono_of_mem ?_ refine inter_mem ?_ (mem_of_superset self_mem_nhdsWithin inter_subset_right) rwa [← Filter.mem_map, ← I.image_eq, I.symm_map_nhdsWithin_image] #align cont_diff_within_at_prop_mono_of_mem contDiffWithinAtProp_mono_of_mem theorem contDiffWithinAtProp_id (x : H) : ContDiffWithinAtProp I I n id univ x := by simp only [ContDiffWithinAtProp, id_comp, preimage_univ, univ_inter] have : ContDiffWithinAt 𝕜 n id (range I) (I x) := contDiff_id.contDiffAt.contDiffWithinAt refine this.congr (fun y hy => ?_) ?_ · simp only [ModelWithCorners.right_inv I hy, mfld_simps] · simp only [mfld_simps] #align cont_diff_within_at_prop_id contDiffWithinAtProp_id def ContMDiffWithinAt (n : ℕ∞) (f : M → M') (s : Set M) (x : M) := LiftPropWithinAt (ContDiffWithinAtProp I I' n) f s x #align cont_mdiff_within_at ContMDiffWithinAt abbrev SmoothWithinAt (f : M → M') (s : Set M) (x : M) := ContMDiffWithinAt I I' ⊤ f s x #align smooth_within_at SmoothWithinAt def ContMDiffAt (n : ℕ∞) (f : M → M') (x : M) := ContMDiffWithinAt I I' n f univ x #align cont_mdiff_at ContMDiffAt theorem contMDiffAt_iff {n : ℕ∞} {f : M → M'} {x : M} : ContMDiffAt I I' n f x ↔ ContinuousAt f x ∧ ContDiffWithinAt 𝕜 n (extChartAt I' (f x) ∘ f ∘ (extChartAt I x).symm) (range I) (extChartAt I x x) := liftPropAt_iff.trans <\| by rw [ContDiffWithinAtProp, preimage_univ, univ_inter]; rfl #align cont_mdiff_at_iff contMDiffAt_iff abbrev SmoothAt (f : M → M') (x : M) := ContMDiffAt I I' ⊤ f x #align smooth_at SmoothAt def ContMDiffOn (n : ℕ∞) (f : M → M') (s : Set M) := ∀ x ∈ s, ContMDiffWithinAt I I' n f s x #align cont_mdiff_on ContMDiffOn abbrev SmoothOn (f : M → M') (s : Set M) := ContMDiffOn I I' ⊤ f s #align smooth_on SmoothOn def ContMDiff (n : ℕ∞) (f : M → M') := ∀ x, ContMDiffAt I I' n f x #align cont_mdiff ContMDiff abbrev Smooth (f : M → M') := ContMDiff I I' ⊤ f #align smooth Smooth variable {I I'} theorem ContMDiffWithinAt.of_le (hf : ContMDiffWithinAt I I' n f s x) (le : m ≤ n) : ContMDiffWithinAt I I' m f s x := by simp only [ContMDiffWithinAt, LiftPropWithinAt] at hf ⊢ exact ⟨hf.1, hf.2.of_le le⟩ #align cont_mdiff_within_at.of_le ContMDiffWithinAt.of_le theorem ContMDiffAt.of_le (hf : ContMDiffAt I I' n f x) (le : m ≤ n) : ContMDiffAt I I' m f x := ContMDiffWithinAt.of_le hf le #align cont_mdiff_at.of_le ContMDiffAt.of_le theorem ContMDiffOn.of_le (hf : ContMDiffOn I I' n f s) (le : m ≤ n) : ContMDiffOn I I' m f s := fun x hx => (hf x hx).of_le le #align cont_mdiff_on.of_le ContMDiffOn.of_le theorem ContMDiff.of_le (hf : ContMDiff I I' n f) (le : m ≤ n) : ContMDiff I I' m f := fun x => (hf x).of_le le #align cont_mdiff.of_le ContMDiff.of_le theorem ContMDiff.smooth (h : ContMDiff I I' ⊤ f) : Smooth I I' f := h #align cont_mdiff.smooth ContMDiff.smooth theorem Smooth.contMDiff (h : Smooth I I' f) : ContMDiff I I' n f := h.of_le le_top #align smooth.cont_mdiff Smooth.contMDiff theorem ContMDiffOn.smoothOn (h : ContMDiffOn I I' ⊤ f s) : SmoothOn I I' f s := h #align cont_mdiff_on.smooth_on ContMDiffOn.smoothOn theorem SmoothOn.contMDiffOn (h : SmoothOn I I' f s) : ContMDiffOn I I' n f s := h.of_le le_top #align smooth_on.cont_mdiff_on SmoothOn.contMDiffOn theorem ContMDiffAt.smoothAt (h : ContMDiffAt I I' ⊤ f x) : SmoothAt I I' f x := h #align cont_mdiff_at.smooth_at ContMDiffAt.smoothAt theorem SmoothAt.contMDiffAt (h : SmoothAt I I' f x) : ContMDiffAt I I' n f x := h.of_le le_top #align smooth_at.cont_mdiff_at SmoothAt.contMDiffAt theorem ContMDiffWithinAt.smoothWithinAt (h : ContMDiffWithinAt I I' ⊤ f s x) : SmoothWithinAt I I' f s x := h #align cont_mdiff_within_at.smooth_within_at ContMDiffWithinAt.smoothWithinAt theorem SmoothWithinAt.contMDiffWithinAt (h : SmoothWithinAt I I' f s x) : ContMDiffWithinAt I I' n f s x := h.of_le le_top #align smooth_within_at.cont_mdiff_within_at SmoothWithinAt.contMDiffWithinAt theorem ContMDiff.contMDiffAt (h : ContMDiff I I' n f) : ContMDiffAt I I' n f x := h x #align cont_mdiff.cont_mdiff_at ContMDiff.contMDiffAt theorem Smooth.smoothAt (h : Smooth I I' f) : SmoothAt I I' f x := ContMDiff.contMDiffAt h #align smooth.smooth_at Smooth.smoothAt theorem contMDiffWithinAt_univ : ContMDiffWithinAt I I' n f univ x ↔ ContMDiffAt I I' n f x := Iff.rfl #align cont_mdiff_within_at_univ contMDiffWithinAt_univ theorem smoothWithinAt_univ : SmoothWithinAt I I' f univ x ↔ SmoothAt I I' f x := contMDiffWithinAt_univ #align smooth_within_at_univ smoothWithinAt_univ theorem contMDiffOn_univ : ContMDiffOn I I' n f univ ↔ ContMDiff I I' n f := by simp only [ContMDiffOn, ContMDiff, contMDiffWithinAt_univ, forall_prop_of_true, mem_univ] #align cont_mdiff_on_univ contMDiffOn_univ theorem smoothOn_univ : SmoothOn I I' f univ ↔ Smooth I I' f := contMDiffOn_univ #align smooth_on_univ smoothOn_univ theorem contMDiffWithinAt_iff : ContMDiffWithinAt I I' n f s x ↔ ContinuousWithinAt f s x ∧ ContDiffWithinAt 𝕜 n (extChartAt I' (f x) ∘ f ∘ (extChartAt I x).symm) ((extChartAt I x).symm ⁻¹' s ∩ range I) (extChartAt I x x) := by simp_rw [ContMDiffWithinAt, liftPropWithinAt_iff']; rfl #align cont_mdiff_within_at_iff contMDiffWithinAt_iff theorem contMDiffWithinAt_iff' : ContMDiffWithinAt I I' n f s x ↔ ContinuousWithinAt f s x ∧ ContDiffWithinAt 𝕜 n (extChartAt I' (f x) ∘ f ∘ (extChartAt I x).symm) ((extChartAt I x).target ∩ (extChartAt I x).symm ⁻¹' (s ∩ f ⁻¹' (extChartAt I' (f x)).source)) (extChartAt I x x) := by simp only [ContMDiffWithinAt, liftPropWithinAt_iff'] exact and_congr_right fun hc => contDiffWithinAt_congr_nhds <\| hc.nhdsWithin_extChartAt_symm_preimage_inter_range I I' #align cont_mdiff_within_at_iff' contMDiffWithinAt_iff'	Mathlib/Geometry/Manifold/ContMDiff/Defs.lean	349	360	theorem contMDiffWithinAt_iff_target : ContMDiffWithinAt I I' n f s x ↔ ContinuousWithinAt f s x ∧ ContMDiffWithinAt I 𝓘(𝕜, E') n (extChartAt I' (f x) ∘ f) s x := by	simp_rw [ContMDiffWithinAt, liftPropWithinAt_iff', ← and_assoc] have cont : ContinuousWithinAt f s x ∧ ContinuousWithinAt (extChartAt I' (f x) ∘ f) s x ↔ ContinuousWithinAt f s x := and_iff_left_of_imp <\| (continuousAt_extChartAt _ _).comp_continuousWithinAt simp_rw [cont, ContDiffWithinAtProp, extChartAt, PartialHomeomorph.extend, PartialEquiv.coe_trans, ModelWithCorners.toPartialEquiv_coe, PartialHomeomorph.coe_coe, modelWithCornersSelf_coe, chartAt_self_eq, PartialHomeomorph.refl_apply, id_comp] rfl
import Mathlib.Algebra.GCDMonoid.Basic import Mathlib.Data.Multiset.FinsetOps import Mathlib.Data.Multiset.Fold #align_import algebra.gcd_monoid.multiset from "leanprover-community/mathlib"@"f694c7dead66f5d4c80f446c796a5aad14707f0e" namespace Multiset variable {α : Type*} [CancelCommMonoidWithZero α] [NormalizedGCDMonoid α] section lcm def lcm (s : Multiset α) : α := s.fold GCDMonoid.lcm 1 #align multiset.lcm Multiset.lcm @[simp] theorem lcm_zero : (0 : Multiset α).lcm = 1 := fold_zero _ _ #align multiset.lcm_zero Multiset.lcm_zero @[simp] theorem lcm_cons (a : α) (s : Multiset α) : (a ::ₘ s).lcm = GCDMonoid.lcm a s.lcm := fold_cons_left _ _ _ _ #align multiset.lcm_cons Multiset.lcm_cons @[simp] theorem lcm_singleton {a : α} : ({a} : Multiset α).lcm = normalize a := (fold_singleton _ _ _).trans <\| lcm_one_right _ #align multiset.lcm_singleton Multiset.lcm_singleton @[simp] theorem lcm_add (s₁ s₂ : Multiset α) : (s₁ + s₂).lcm = GCDMonoid.lcm s₁.lcm s₂.lcm := Eq.trans (by simp [lcm]) (fold_add _ _ _ _ _) #align multiset.lcm_add Multiset.lcm_add theorem lcm_dvd {s : Multiset α} {a : α} : s.lcm ∣ a ↔ ∀ b ∈ s, b ∣ a := Multiset.induction_on s (by simp) (by simp (config := { contextual := true }) [or_imp, forall_and, lcm_dvd_iff]) #align multiset.lcm_dvd Multiset.lcm_dvd theorem dvd_lcm {s : Multiset α} {a : α} (h : a ∈ s) : a ∣ s.lcm := lcm_dvd.1 dvd_rfl _ h #align multiset.dvd_lcm Multiset.dvd_lcm theorem lcm_mono {s₁ s₂ : Multiset α} (h : s₁ ⊆ s₂) : s₁.lcm ∣ s₂.lcm := lcm_dvd.2 fun _ hb ↦ dvd_lcm (h hb) #align multiset.lcm_mono Multiset.lcm_mono @[simp 1100] theorem normalize_lcm (s : Multiset α) : normalize s.lcm = s.lcm := Multiset.induction_on s (by simp) fun a s _ ↦ by simp #align multiset.normalize_lcm Multiset.normalize_lcm @[simp] nonrec theorem lcm_eq_zero_iff [Nontrivial α] (s : Multiset α) : s.lcm = 0 ↔ (0 : α) ∈ s := by induction' s using Multiset.induction_on with a s ihs · simp only [lcm_zero, one_ne_zero, not_mem_zero] · simp only [mem_cons, lcm_cons, lcm_eq_zero_iff, ihs, @eq_comm _ a] #align multiset.lcm_eq_zero_iff Multiset.lcm_eq_zero_iff variable [DecidableEq α] @[simp] theorem lcm_dedup (s : Multiset α) : (dedup s).lcm = s.lcm := Multiset.induction_on s (by simp) fun a s IH ↦ by by_cases h : a ∈ s <;> simp [IH, h] unfold lcm rw [← cons_erase h, fold_cons_left, ← lcm_assoc, lcm_same] apply lcm_eq_of_associated_left (associated_normalize _) #align multiset.lcm_dedup Multiset.lcm_dedup @[simp] theorem lcm_ndunion (s₁ s₂ : Multiset α) : (ndunion s₁ s₂).lcm = GCDMonoid.lcm s₁.lcm s₂.lcm := by rw [← lcm_dedup, dedup_ext.2, lcm_dedup, lcm_add] simp #align multiset.lcm_ndunion Multiset.lcm_ndunion @[simp]	Mathlib/Algebra/GCDMonoid/Multiset.lean	110	112	theorem lcm_union (s₁ s₂ : Multiset α) : (s₁ ∪ s₂).lcm = GCDMonoid.lcm s₁.lcm s₂.lcm := by	rw [← lcm_dedup, dedup_ext.2, lcm_dedup, lcm_add] simp
import Mathlib.Analysis.InnerProductSpace.TwoDim import Mathlib.Geometry.Euclidean.Angle.Unoriented.Basic #align_import geometry.euclidean.angle.oriented.basic from "leanprover-community/mathlib"@"f0c8bf9245297a541f468be517f1bde6195105e9" noncomputable section open FiniteDimensional Complex open scoped Real RealInnerProductSpace ComplexConjugate namespace Orientation attribute [local instance] Complex.finrank_real_complex_fact variable {V V' : Type} variable [NormedAddCommGroup V] [NormedAddCommGroup V'] variable [InnerProductSpace ℝ V] [InnerProductSpace ℝ V'] variable [Fact (finrank ℝ V = 2)] [Fact (finrank ℝ V' = 2)] (o : Orientation ℝ V (Fin 2)) local notation "ω" => o.areaForm def oangle (x y : V) : Real.Angle := Complex.arg (o.kahler x y) #align orientation.oangle Orientation.oangle theorem continuousAt_oangle {x : V × V} (hx1 : x.1 ≠ 0) (hx2 : x.2 ≠ 0) : ContinuousAt (fun y : V × V => o.oangle y.1 y.2) x := by refine (Complex.continuousAt_arg_coe_angle ?_).comp ?_ · exact o.kahler_ne_zero hx1 hx2 exact ((continuous_ofReal.comp continuous_inner).add ((continuous_ofReal.comp o.areaForm'.continuous₂).mul continuous_const)).continuousAt #align orientation.continuous_at_oangle Orientation.continuousAt_oangle @[simp] theorem oangle_zero_left (x : V) : o.oangle 0 x = 0 := by simp [oangle] #align orientation.oangle_zero_left Orientation.oangle_zero_left @[simp] theorem oangle_zero_right (x : V) : o.oangle x 0 = 0 := by simp [oangle] #align orientation.oangle_zero_right Orientation.oangle_zero_right @[simp] theorem oangle_self (x : V) : o.oangle x x = 0 := by rw [oangle, kahler_apply_self, ← ofReal_pow] convert QuotientAddGroup.mk_zero (AddSubgroup.zmultiples (2 π)) apply arg_ofReal_of_nonneg positivity #align orientation.oangle_self Orientation.oangle_self theorem left_ne_zero_of_oangle_ne_zero {x y : V} (h : o.oangle x y ≠ 0) : x ≠ 0 := by rintro rfl; simp at h #align orientation.left_ne_zero_of_oangle_ne_zero Orientation.left_ne_zero_of_oangle_ne_zero theorem right_ne_zero_of_oangle_ne_zero {x y : V} (h : o.oangle x y ≠ 0) : y ≠ 0 := by rintro rfl; simp at h #align orientation.right_ne_zero_of_oangle_ne_zero Orientation.right_ne_zero_of_oangle_ne_zero theorem ne_of_oangle_ne_zero {x y : V} (h : o.oangle x y ≠ 0) : x ≠ y := by rintro rfl; simp at h #align orientation.ne_of_oangle_ne_zero Orientation.ne_of_oangle_ne_zero theorem left_ne_zero_of_oangle_eq_pi {x y : V} (h : o.oangle x y = π) : x ≠ 0 := o.left_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_ne_zero : o.oangle x y ≠ 0) #align orientation.left_ne_zero_of_oangle_eq_pi Orientation.left_ne_zero_of_oangle_eq_pi theorem right_ne_zero_of_oangle_eq_pi {x y : V} (h : o.oangle x y = π) : y ≠ 0 := o.right_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_ne_zero : o.oangle x y ≠ 0) #align orientation.right_ne_zero_of_oangle_eq_pi Orientation.right_ne_zero_of_oangle_eq_pi theorem ne_of_oangle_eq_pi {x y : V} (h : o.oangle x y = π) : x ≠ y := o.ne_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_ne_zero : o.oangle x y ≠ 0) #align orientation.ne_of_oangle_eq_pi Orientation.ne_of_oangle_eq_pi theorem left_ne_zero_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = (π / 2 : ℝ)) : x ≠ 0 := o.left_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.left_ne_zero_of_oangle_eq_pi_div_two Orientation.left_ne_zero_of_oangle_eq_pi_div_two theorem right_ne_zero_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = (π / 2 : ℝ)) : y ≠ 0 := o.right_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.right_ne_zero_of_oangle_eq_pi_div_two Orientation.right_ne_zero_of_oangle_eq_pi_div_two theorem ne_of_oangle_eq_pi_div_two {x y : V} (h : o.oangle x y = (π / 2 : ℝ)) : x ≠ y := o.ne_of_oangle_ne_zero (h.symm ▸ Real.Angle.pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.ne_of_oangle_eq_pi_div_two Orientation.ne_of_oangle_eq_pi_div_two theorem left_ne_zero_of_oangle_eq_neg_pi_div_two {x y : V} (h : o.oangle x y = (-π / 2 : ℝ)) : x ≠ 0 := o.left_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.neg_pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.left_ne_zero_of_oangle_eq_neg_pi_div_two Orientation.left_ne_zero_of_oangle_eq_neg_pi_div_two theorem right_ne_zero_of_oangle_eq_neg_pi_div_two {x y : V} (h : o.oangle x y = (-π / 2 : ℝ)) : y ≠ 0 := o.right_ne_zero_of_oangle_ne_zero (h.symm ▸ Real.Angle.neg_pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.right_ne_zero_of_oangle_eq_neg_pi_div_two Orientation.right_ne_zero_of_oangle_eq_neg_pi_div_two theorem ne_of_oangle_eq_neg_pi_div_two {x y : V} (h : o.oangle x y = (-π / 2 : ℝ)) : x ≠ y := o.ne_of_oangle_ne_zero (h.symm ▸ Real.Angle.neg_pi_div_two_ne_zero : o.oangle x y ≠ 0) #align orientation.ne_of_oangle_eq_neg_pi_div_two Orientation.ne_of_oangle_eq_neg_pi_div_two theorem left_ne_zero_of_oangle_sign_ne_zero {x y : V} (h : (o.oangle x y).sign ≠ 0) : x ≠ 0 := o.left_ne_zero_of_oangle_ne_zero (Real.Angle.sign_ne_zero_iff.1 h).1 #align orientation.left_ne_zero_of_oangle_sign_ne_zero Orientation.left_ne_zero_of_oangle_sign_ne_zero theorem right_ne_zero_of_oangle_sign_ne_zero {x y : V} (h : (o.oangle x y).sign ≠ 0) : y ≠ 0 := o.right_ne_zero_of_oangle_ne_zero (Real.Angle.sign_ne_zero_iff.1 h).1 #align orientation.right_ne_zero_of_oangle_sign_ne_zero Orientation.right_ne_zero_of_oangle_sign_ne_zero theorem ne_of_oangle_sign_ne_zero {x y : V} (h : (o.oangle x y).sign ≠ 0) : x ≠ y := o.ne_of_oangle_ne_zero (Real.Angle.sign_ne_zero_iff.1 h).1 #align orientation.ne_of_oangle_sign_ne_zero Orientation.ne_of_oangle_sign_ne_zero theorem left_ne_zero_of_oangle_sign_eq_one {x y : V} (h : (o.oangle x y).sign = 1) : x ≠ 0 := o.left_ne_zero_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.left_ne_zero_of_oangle_sign_eq_one Orientation.left_ne_zero_of_oangle_sign_eq_one theorem right_ne_zero_of_oangle_sign_eq_one {x y : V} (h : (o.oangle x y).sign = 1) : y ≠ 0 := o.right_ne_zero_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.right_ne_zero_of_oangle_sign_eq_one Orientation.right_ne_zero_of_oangle_sign_eq_one theorem ne_of_oangle_sign_eq_one {x y : V} (h : (o.oangle x y).sign = 1) : x ≠ y := o.ne_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.ne_of_oangle_sign_eq_one Orientation.ne_of_oangle_sign_eq_one theorem left_ne_zero_of_oangle_sign_eq_neg_one {x y : V} (h : (o.oangle x y).sign = -1) : x ≠ 0 := o.left_ne_zero_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.left_ne_zero_of_oangle_sign_eq_neg_one Orientation.left_ne_zero_of_oangle_sign_eq_neg_one theorem right_ne_zero_of_oangle_sign_eq_neg_one {x y : V} (h : (o.oangle x y).sign = -1) : y ≠ 0 := o.right_ne_zero_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.right_ne_zero_of_oangle_sign_eq_neg_one Orientation.right_ne_zero_of_oangle_sign_eq_neg_one theorem ne_of_oangle_sign_eq_neg_one {x y : V} (h : (o.oangle x y).sign = -1) : x ≠ y := o.ne_of_oangle_sign_ne_zero (h.symm ▸ by decide : (o.oangle x y).sign ≠ 0) #align orientation.ne_of_oangle_sign_eq_neg_one Orientation.ne_of_oangle_sign_eq_neg_one theorem oangle_rev (x y : V) : o.oangle y x = -o.oangle x y := by simp only [oangle, o.kahler_swap y x, Complex.arg_conj_coe_angle] #align orientation.oangle_rev Orientation.oangle_rev @[simp] theorem oangle_add_oangle_rev (x y : V) : o.oangle x y + o.oangle y x = 0 := by simp [o.oangle_rev y x] #align orientation.oangle_add_oangle_rev Orientation.oangle_add_oangle_rev theorem oangle_neg_left {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : o.oangle (-x) y = o.oangle x y + π := by simp only [oangle, map_neg] convert Complex.arg_neg_coe_angle _ exact o.kahler_ne_zero hx hy #align orientation.oangle_neg_left Orientation.oangle_neg_left theorem oangle_neg_right {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : o.oangle x (-y) = o.oangle x y + π := by simp only [oangle, map_neg] convert Complex.arg_neg_coe_angle _ exact o.kahler_ne_zero hx hy #align orientation.oangle_neg_right Orientation.oangle_neg_right @[simp] theorem two_zsmul_oangle_neg_left (x y : V) : (2 : ℤ) • o.oangle (-x) y = (2 : ℤ) • o.oangle x y := by by_cases hx : x = 0 · simp [hx] · by_cases hy : y = 0 · simp [hy] · simp [o.oangle_neg_left hx hy] #align orientation.two_zsmul_oangle_neg_left Orientation.two_zsmul_oangle_neg_left @[simp] theorem two_zsmul_oangle_neg_right (x y : V) : (2 : ℤ) • o.oangle x (-y) = (2 : ℤ) • o.oangle x y := by by_cases hx : x = 0 · simp [hx] · by_cases hy : y = 0 · simp [hy] · simp [o.oangle_neg_right hx hy] #align orientation.two_zsmul_oangle_neg_right Orientation.two_zsmul_oangle_neg_right @[simp] theorem oangle_neg_neg (x y : V) : o.oangle (-x) (-y) = o.oangle x y := by simp [oangle] #align orientation.oangle_neg_neg Orientation.oangle_neg_neg theorem oangle_neg_left_eq_neg_right (x y : V) : o.oangle (-x) y = o.oangle x (-y) := by rw [← neg_neg y, oangle_neg_neg, neg_neg] #align orientation.oangle_neg_left_eq_neg_right Orientation.oangle_neg_left_eq_neg_right @[simp] theorem oangle_neg_self_left {x : V} (hx : x ≠ 0) : o.oangle (-x) x = π := by simp [oangle_neg_left, hx] #align orientation.oangle_neg_self_left Orientation.oangle_neg_self_left @[simp] theorem oangle_neg_self_right {x : V} (hx : x ≠ 0) : o.oangle x (-x) = π := by simp [oangle_neg_right, hx] #align orientation.oangle_neg_self_right Orientation.oangle_neg_self_right -- @[simp] -- Porting note (#10618): simp can prove this theorem two_zsmul_oangle_neg_self_left (x : V) : (2 : ℤ) • o.oangle (-x) x = 0 := by by_cases hx : x = 0 <;> simp [hx] #align orientation.two_zsmul_oangle_neg_self_left Orientation.two_zsmul_oangle_neg_self_left -- @[simp] -- Porting note (#10618): simp can prove this theorem two_zsmul_oangle_neg_self_right (x : V) : (2 : ℤ) • o.oangle x (-x) = 0 := by by_cases hx : x = 0 <;> simp [hx] #align orientation.two_zsmul_oangle_neg_self_right Orientation.two_zsmul_oangle_neg_self_right @[simp] theorem oangle_add_oangle_rev_neg_left (x y : V) : o.oangle (-x) y + o.oangle (-y) x = 0 := by rw [oangle_neg_left_eq_neg_right, oangle_rev, add_left_neg] #align orientation.oangle_add_oangle_rev_neg_left Orientation.oangle_add_oangle_rev_neg_left @[simp] theorem oangle_add_oangle_rev_neg_right (x y : V) : o.oangle x (-y) + o.oangle y (-x) = 0 := by rw [o.oangle_rev (-x), oangle_neg_left_eq_neg_right, add_neg_self] #align orientation.oangle_add_oangle_rev_neg_right Orientation.oangle_add_oangle_rev_neg_right @[simp] theorem oangle_smul_left_of_pos (x y : V) {r : ℝ} (hr : 0 < r) : o.oangle (r • x) y = o.oangle x y := by simp [oangle, Complex.arg_real_mul _ hr] #align orientation.oangle_smul_left_of_pos Orientation.oangle_smul_left_of_pos @[simp] theorem oangle_smul_right_of_pos (x y : V) {r : ℝ} (hr : 0 < r) : o.oangle x (r • y) = o.oangle x y := by simp [oangle, Complex.arg_real_mul _ hr] #align orientation.oangle_smul_right_of_pos Orientation.oangle_smul_right_of_pos @[simp] theorem oangle_smul_left_of_neg (x y : V) {r : ℝ} (hr : r < 0) : o.oangle (r • x) y = o.oangle (-x) y := by rw [← neg_neg r, neg_smul, ← smul_neg, o.oangle_smul_left_of_pos _ _ (neg_pos_of_neg hr)] #align orientation.oangle_smul_left_of_neg Orientation.oangle_smul_left_of_neg @[simp] theorem oangle_smul_right_of_neg (x y : V) {r : ℝ} (hr : r < 0) : o.oangle x (r • y) = o.oangle x (-y) := by rw [← neg_neg r, neg_smul, ← smul_neg, o.oangle_smul_right_of_pos _ _ (neg_pos_of_neg hr)] #align orientation.oangle_smul_right_of_neg Orientation.oangle_smul_right_of_neg @[simp] theorem oangle_smul_left_self_of_nonneg (x : V) {r : ℝ} (hr : 0 ≤ r) : o.oangle (r • x) x = 0 := by rcases hr.lt_or_eq with (h \| h) · simp [h] · simp [h.symm] #align orientation.oangle_smul_left_self_of_nonneg Orientation.oangle_smul_left_self_of_nonneg @[simp] theorem oangle_smul_right_self_of_nonneg (x : V) {r : ℝ} (hr : 0 ≤ r) : o.oangle x (r • x) = 0 := by rcases hr.lt_or_eq with (h \| h) · simp [h] · simp [h.symm] #align orientation.oangle_smul_right_self_of_nonneg Orientation.oangle_smul_right_self_of_nonneg @[simp] theorem oangle_smul_smul_self_of_nonneg (x : V) {r₁ r₂ : ℝ} (hr₁ : 0 ≤ r₁) (hr₂ : 0 ≤ r₂) : o.oangle (r₁ • x) (r₂ • x) = 0 := by rcases hr₁.lt_or_eq with (h \| h) · simp [h, hr₂] · simp [h.symm] #align orientation.oangle_smul_smul_self_of_nonneg Orientation.oangle_smul_smul_self_of_nonneg @[simp] theorem two_zsmul_oangle_smul_left_of_ne_zero (x y : V) {r : ℝ} (hr : r ≠ 0) : (2 : ℤ) • o.oangle (r • x) y = (2 : ℤ) • o.oangle x y := by rcases hr.lt_or_lt with (h \| h) <;> simp [h] #align orientation.two_zsmul_oangle_smul_left_of_ne_zero Orientation.two_zsmul_oangle_smul_left_of_ne_zero @[simp] theorem two_zsmul_oangle_smul_right_of_ne_zero (x y : V) {r : ℝ} (hr : r ≠ 0) : (2 : ℤ) • o.oangle x (r • y) = (2 : ℤ) • o.oangle x y := by rcases hr.lt_or_lt with (h \| h) <;> simp [h] #align orientation.two_zsmul_oangle_smul_right_of_ne_zero Orientation.two_zsmul_oangle_smul_right_of_ne_zero @[simp] theorem two_zsmul_oangle_smul_left_self (x : V) {r : ℝ} : (2 : ℤ) • o.oangle (r • x) x = 0 := by rcases lt_or_le r 0 with (h \| h) <;> simp [h] #align orientation.two_zsmul_oangle_smul_left_self Orientation.two_zsmul_oangle_smul_left_self @[simp] theorem two_zsmul_oangle_smul_right_self (x : V) {r : ℝ} : (2 : ℤ) • o.oangle x (r • x) = 0 := by rcases lt_or_le r 0 with (h \| h) <;> simp [h] #align orientation.two_zsmul_oangle_smul_right_self Orientation.two_zsmul_oangle_smul_right_self @[simp] theorem two_zsmul_oangle_smul_smul_self (x : V) {r₁ r₂ : ℝ} : (2 : ℤ) • o.oangle (r₁ • x) (r₂ • x) = 0 := by by_cases h : r₁ = 0 <;> simp [h] #align orientation.two_zsmul_oangle_smul_smul_self Orientation.two_zsmul_oangle_smul_smul_self theorem two_zsmul_oangle_left_of_span_eq {x y : V} (z : V) (h : (ℝ ∙ x) = ℝ ∙ y) : (2 : ℤ) • o.oangle x z = (2 : ℤ) • o.oangle y z := by rw [Submodule.span_singleton_eq_span_singleton] at h rcases h with ⟨r, rfl⟩ exact (o.two_zsmul_oangle_smul_left_of_ne_zero _ _ (Units.ne_zero _)).symm #align orientation.two_zsmul_oangle_left_of_span_eq Orientation.two_zsmul_oangle_left_of_span_eq theorem two_zsmul_oangle_right_of_span_eq (x : V) {y z : V} (h : (ℝ ∙ y) = ℝ ∙ z) : (2 : ℤ) • o.oangle x y = (2 : ℤ) • o.oangle x z := by rw [Submodule.span_singleton_eq_span_singleton] at h rcases h with ⟨r, rfl⟩ exact (o.two_zsmul_oangle_smul_right_of_ne_zero _ _ (Units.ne_zero _)).symm #align orientation.two_zsmul_oangle_right_of_span_eq Orientation.two_zsmul_oangle_right_of_span_eq theorem two_zsmul_oangle_of_span_eq_of_span_eq {w x y z : V} (hwx : (ℝ ∙ w) = ℝ ∙ x) (hyz : (ℝ ∙ y) = ℝ ∙ z) : (2 : ℤ) • o.oangle w y = (2 : ℤ) • o.oangle x z := by rw [o.two_zsmul_oangle_left_of_span_eq y hwx, o.two_zsmul_oangle_right_of_span_eq x hyz] #align orientation.two_zsmul_oangle_of_span_eq_of_span_eq Orientation.two_zsmul_oangle_of_span_eq_of_span_eq theorem oangle_eq_zero_iff_oangle_rev_eq_zero {x y : V} : o.oangle x y = 0 ↔ o.oangle y x = 0 := by rw [oangle_rev, neg_eq_zero] #align orientation.oangle_eq_zero_iff_oangle_rev_eq_zero Orientation.oangle_eq_zero_iff_oangle_rev_eq_zero theorem oangle_eq_zero_iff_sameRay {x y : V} : o.oangle x y = 0 ↔ SameRay ℝ x y := by rw [oangle, kahler_apply_apply, Complex.arg_coe_angle_eq_iff_eq_toReal, Real.Angle.toReal_zero, Complex.arg_eq_zero_iff] simpa using o.nonneg_inner_and_areaForm_eq_zero_iff_sameRay x y #align orientation.oangle_eq_zero_iff_same_ray Orientation.oangle_eq_zero_iff_sameRay theorem oangle_eq_pi_iff_oangle_rev_eq_pi {x y : V} : o.oangle x y = π ↔ o.oangle y x = π := by rw [oangle_rev, neg_eq_iff_eq_neg, Real.Angle.neg_coe_pi] #align orientation.oangle_eq_pi_iff_oangle_rev_eq_pi Orientation.oangle_eq_pi_iff_oangle_rev_eq_pi theorem oangle_eq_pi_iff_sameRay_neg {x y : V} : o.oangle x y = π ↔ x ≠ 0 ∧ y ≠ 0 ∧ SameRay ℝ x (-y) := by rw [← o.oangle_eq_zero_iff_sameRay] constructor · intro h by_cases hx : x = 0; · simp [hx, Real.Angle.pi_ne_zero.symm] at h by_cases hy : y = 0; · simp [hy, Real.Angle.pi_ne_zero.symm] at h refine ⟨hx, hy, ?_⟩ rw [o.oangle_neg_right hx hy, h, Real.Angle.coe_pi_add_coe_pi] · rintro ⟨hx, hy, h⟩ rwa [o.oangle_neg_right hx hy, ← Real.Angle.sub_coe_pi_eq_add_coe_pi, sub_eq_zero] at h #align orientation.oangle_eq_pi_iff_same_ray_neg Orientation.oangle_eq_pi_iff_sameRay_neg theorem oangle_eq_zero_or_eq_pi_iff_not_linearIndependent {x y : V} : o.oangle x y = 0 ∨ o.oangle x y = π ↔ ¬LinearIndependent ℝ ![x, y] := by rw [oangle_eq_zero_iff_sameRay, oangle_eq_pi_iff_sameRay_neg, sameRay_or_ne_zero_and_sameRay_neg_iff_not_linearIndependent] #align orientation.oangle_eq_zero_or_eq_pi_iff_not_linear_independent Orientation.oangle_eq_zero_or_eq_pi_iff_not_linearIndependent theorem oangle_eq_zero_or_eq_pi_iff_right_eq_smul {x y : V} : o.oangle x y = 0 ∨ o.oangle x y = π ↔ x = 0 ∨ ∃ r : ℝ, y = r • x := by rw [oangle_eq_zero_iff_sameRay, oangle_eq_pi_iff_sameRay_neg] refine ⟨fun h => ?_, fun h => ?_⟩ · rcases h with (h \| ⟨-, -, h⟩) · by_cases hx : x = 0; · simp [hx] obtain ⟨r, -, rfl⟩ := h.exists_nonneg_left hx exact Or.inr ⟨r, rfl⟩ · by_cases hx : x = 0; · simp [hx] obtain ⟨r, -, hy⟩ := h.exists_nonneg_left hx refine Or.inr ⟨-r, ?_⟩ simp [hy] · rcases h with (rfl \| ⟨r, rfl⟩); · simp by_cases hx : x = 0; · simp [hx] rcases lt_trichotomy r 0 with (hr \| hr \| hr) · rw [← neg_smul] exact Or.inr ⟨hx, smul_ne_zero hr.ne hx, SameRay.sameRay_pos_smul_right x (Left.neg_pos_iff.2 hr)⟩ · simp [hr] · exact Or.inl (SameRay.sameRay_pos_smul_right x hr) #align orientation.oangle_eq_zero_or_eq_pi_iff_right_eq_smul Orientation.oangle_eq_zero_or_eq_pi_iff_right_eq_smul theorem oangle_ne_zero_and_ne_pi_iff_linearIndependent {x y : V} : o.oangle x y ≠ 0 ∧ o.oangle x y ≠ π ↔ LinearIndependent ℝ ![x, y] := by rw [← not_or, ← not_iff_not, Classical.not_not, oangle_eq_zero_or_eq_pi_iff_not_linearIndependent] #align orientation.oangle_ne_zero_and_ne_pi_iff_linear_independent Orientation.oangle_ne_zero_and_ne_pi_iff_linearIndependent theorem eq_iff_norm_eq_and_oangle_eq_zero (x y : V) : x = y ↔ ‖x‖ = ‖y‖ ∧ o.oangle x y = 0 := by rw [oangle_eq_zero_iff_sameRay] constructor · rintro rfl simp; rfl · rcases eq_or_ne y 0 with (rfl \| hy) · simp rintro ⟨h₁, h₂⟩ obtain ⟨r, hr, rfl⟩ := h₂.exists_nonneg_right hy have : ‖y‖ ≠ 0 := by simpa using hy obtain rfl : r = 1 := by apply mul_right_cancel₀ this simpa [norm_smul, _root_.abs_of_nonneg hr] using h₁ simp #align orientation.eq_iff_norm_eq_and_oangle_eq_zero Orientation.eq_iff_norm_eq_and_oangle_eq_zero theorem eq_iff_oangle_eq_zero_of_norm_eq {x y : V} (h : ‖x‖ = ‖y‖) : x = y ↔ o.oangle x y = 0 := ⟨fun he => ((o.eq_iff_norm_eq_and_oangle_eq_zero x y).1 he).2, fun ha => (o.eq_iff_norm_eq_and_oangle_eq_zero x y).2 ⟨h, ha⟩⟩ #align orientation.eq_iff_oangle_eq_zero_of_norm_eq Orientation.eq_iff_oangle_eq_zero_of_norm_eq theorem eq_iff_norm_eq_of_oangle_eq_zero {x y : V} (h : o.oangle x y = 0) : x = y ↔ ‖x‖ = ‖y‖ := ⟨fun he => ((o.eq_iff_norm_eq_and_oangle_eq_zero x y).1 he).1, fun hn => (o.eq_iff_norm_eq_and_oangle_eq_zero x y).2 ⟨hn, h⟩⟩ #align orientation.eq_iff_norm_eq_of_oangle_eq_zero Orientation.eq_iff_norm_eq_of_oangle_eq_zero @[simp] theorem oangle_add {x y z : V} (hx : x ≠ 0) (hy : y ≠ 0) (hz : z ≠ 0) : o.oangle x y + o.oangle y z = o.oangle x z := by simp_rw [oangle] rw [← Complex.arg_mul_coe_angle, o.kahler_mul y x z] · congr 1 convert Complex.arg_real_mul _ (_ : 0 < ‖y‖ ^ 2) using 2 · norm_cast · have : 0 < ‖y‖ := by simpa using hy positivity · exact o.kahler_ne_zero hx hy · exact o.kahler_ne_zero hy hz #align orientation.oangle_add Orientation.oangle_add @[simp] theorem oangle_add_swap {x y z : V} (hx : x ≠ 0) (hy : y ≠ 0) (hz : z ≠ 0) : o.oangle y z + o.oangle x y = o.oangle x z := by rw [add_comm, o.oangle_add hx hy hz] #align orientation.oangle_add_swap Orientation.oangle_add_swap @[simp] theorem oangle_sub_left {x y z : V} (hx : x ≠ 0) (hy : y ≠ 0) (hz : z ≠ 0) : o.oangle x z - o.oangle x y = o.oangle y z := by rw [sub_eq_iff_eq_add, o.oangle_add_swap hx hy hz] #align orientation.oangle_sub_left Orientation.oangle_sub_left @[simp] theorem oangle_sub_right {x y z : V} (hx : x ≠ 0) (hy : y ≠ 0) (hz : z ≠ 0) : o.oangle x z - o.oangle y z = o.oangle x y := by rw [sub_eq_iff_eq_add, o.oangle_add hx hy hz] #align orientation.oangle_sub_right Orientation.oangle_sub_right @[simp] theorem oangle_add_cyc3 {x y z : V} (hx : x ≠ 0) (hy : y ≠ 0) (hz : z ≠ 0) : o.oangle x y + o.oangle y z + o.oangle z x = 0 := by simp [hx, hy, hz] #align orientation.oangle_add_cyc3 Orientation.oangle_add_cyc3 @[simp] theorem oangle_add_cyc3_neg_left {x y z : V} (hx : x ≠ 0) (hy : y ≠ 0) (hz : z ≠ 0) : o.oangle (-x) y + o.oangle (-y) z + o.oangle (-z) x = π := by rw [o.oangle_neg_left hx hy, o.oangle_neg_left hy hz, o.oangle_neg_left hz hx, show o.oangle x y + π + (o.oangle y z + π) + (o.oangle z x + π) = o.oangle x y + o.oangle y z + o.oangle z x + (π + π + π : Real.Angle) by abel, o.oangle_add_cyc3 hx hy hz, Real.Angle.coe_pi_add_coe_pi, zero_add, zero_add] #align orientation.oangle_add_cyc3_neg_left Orientation.oangle_add_cyc3_neg_left @[simp] theorem oangle_add_cyc3_neg_right {x y z : V} (hx : x ≠ 0) (hy : y ≠ 0) (hz : z ≠ 0) : o.oangle x (-y) + o.oangle y (-z) + o.oangle z (-x) = π := by simp_rw [← oangle_neg_left_eq_neg_right, o.oangle_add_cyc3_neg_left hx hy hz] #align orientation.oangle_add_cyc3_neg_right Orientation.oangle_add_cyc3_neg_right theorem oangle_sub_eq_oangle_sub_rev_of_norm_eq {x y : V} (h : ‖x‖ = ‖y‖) : o.oangle x (x - y) = o.oangle (y - x) y := by simp [oangle, h] #align orientation.oangle_sub_eq_oangle_sub_rev_of_norm_eq Orientation.oangle_sub_eq_oangle_sub_rev_of_norm_eq theorem oangle_eq_pi_sub_two_zsmul_oangle_sub_of_norm_eq {x y : V} (hn : x ≠ y) (h : ‖x‖ = ‖y‖) : o.oangle y x = π - (2 : ℤ) • o.oangle (y - x) y := by rw [two_zsmul] nth_rw 1 [← o.oangle_sub_eq_oangle_sub_rev_of_norm_eq h] rw [eq_sub_iff_add_eq, ← oangle_neg_neg, ← add_assoc] have hy : y ≠ 0 := by rintro rfl rw [norm_zero, norm_eq_zero] at h exact hn h have hx : x ≠ 0 := norm_ne_zero_iff.1 (h.symm ▸ norm_ne_zero_iff.2 hy) convert o.oangle_add_cyc3_neg_right (neg_ne_zero.2 hy) hx (sub_ne_zero_of_ne hn.symm) using 1 simp #align orientation.oangle_eq_pi_sub_two_zsmul_oangle_sub_of_norm_eq Orientation.oangle_eq_pi_sub_two_zsmul_oangle_sub_of_norm_eq @[simp] theorem oangle_map (x y : V') (f : V ≃ₗᵢ[ℝ] V') : (Orientation.map (Fin 2) f.toLinearEquiv o).oangle x y = o.oangle (f.symm x) (f.symm y) := by simp [oangle, o.kahler_map] #align orientation.oangle_map Orientation.oangle_map @[simp] protected theorem _root_.Complex.oangle (w z : ℂ) : Complex.orientation.oangle w z = Complex.arg (conj w * z) := by simp [oangle] #align complex.oangle Complex.oangle theorem oangle_map_complex (f : V ≃ₗᵢ[ℝ] ℂ) (hf : Orientation.map (Fin 2) f.toLinearEquiv o = Complex.orientation) (x y : V) : o.oangle x y = Complex.arg (conj (f x) * f y) := by rw [← Complex.oangle, ← hf, o.oangle_map] iterate 2 rw [LinearIsometryEquiv.symm_apply_apply] #align orientation.oangle_map_complex Orientation.oangle_map_complex theorem oangle_neg_orientation_eq_neg (x y : V) : (-o).oangle x y = -o.oangle x y := by simp [oangle] #align orientation.oangle_neg_orientation_eq_neg Orientation.oangle_neg_orientation_eq_neg theorem inner_eq_norm_mul_norm_mul_cos_oangle (x y : V) : ⟪x, y⟫ = ‖x‖ * ‖y‖ * Real.Angle.cos (o.oangle x y) := by by_cases hx : x = 0; · simp [hx] by_cases hy : y = 0; · simp [hy] have : ‖x‖ ≠ 0 := by simpa using hx have : ‖y‖ ≠ 0 := by simpa using hy rw [oangle, Real.Angle.cos_coe, Complex.cos_arg, o.abs_kahler] · simp only [kahler_apply_apply, real_smul, add_re, ofReal_re, mul_re, I_re, ofReal_im] field_simp · exact o.kahler_ne_zero hx hy #align orientation.inner_eq_norm_mul_norm_mul_cos_oangle Orientation.inner_eq_norm_mul_norm_mul_cos_oangle theorem cos_oangle_eq_inner_div_norm_mul_norm {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : Real.Angle.cos (o.oangle x y) = ⟪x, y⟫ / (‖x‖ * ‖y‖) := by rw [o.inner_eq_norm_mul_norm_mul_cos_oangle] field_simp [norm_ne_zero_iff.2 hx, norm_ne_zero_iff.2 hy] #align orientation.cos_oangle_eq_inner_div_norm_mul_norm Orientation.cos_oangle_eq_inner_div_norm_mul_norm theorem cos_oangle_eq_cos_angle {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : Real.Angle.cos (o.oangle x y) = Real.cos (InnerProductGeometry.angle x y) := by rw [o.cos_oangle_eq_inner_div_norm_mul_norm hx hy, InnerProductGeometry.cos_angle] #align orientation.cos_oangle_eq_cos_angle Orientation.cos_oangle_eq_cos_angle theorem oangle_eq_angle_or_eq_neg_angle {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : o.oangle x y = InnerProductGeometry.angle x y ∨ o.oangle x y = -InnerProductGeometry.angle x y := Real.Angle.cos_eq_real_cos_iff_eq_or_eq_neg.1 <\| o.cos_oangle_eq_cos_angle hx hy #align orientation.oangle_eq_angle_or_eq_neg_angle Orientation.oangle_eq_angle_or_eq_neg_angle theorem angle_eq_abs_oangle_toReal {x y : V} (hx : x ≠ 0) (hy : y ≠ 0) : InnerProductGeometry.angle x y = \|(o.oangle x y).toReal\| := by have h0 := InnerProductGeometry.angle_nonneg x y have hpi := InnerProductGeometry.angle_le_pi x y rcases o.oangle_eq_angle_or_eq_neg_angle hx hy with (h \| h) · rw [h, eq_comm, Real.Angle.abs_toReal_coe_eq_self_iff] exact ⟨h0, hpi⟩ · rw [h, eq_comm, Real.Angle.abs_toReal_neg_coe_eq_self_iff] exact ⟨h0, hpi⟩ #align orientation.angle_eq_abs_oangle_to_real Orientation.angle_eq_abs_oangle_toReal theorem eq_zero_or_angle_eq_zero_or_pi_of_sign_oangle_eq_zero {x y : V} (h : (o.oangle x y).sign = 0) : x = 0 ∨ y = 0 ∨ InnerProductGeometry.angle x y = 0 ∨ InnerProductGeometry.angle x y = π := by by_cases hx : x = 0; · simp [hx] by_cases hy : y = 0; · simp [hy] rw [o.angle_eq_abs_oangle_toReal hx hy] rw [Real.Angle.sign_eq_zero_iff] at h rcases h with (h \| h) <;> simp [h, Real.pi_pos.le] #align orientation.eq_zero_or_angle_eq_zero_or_pi_of_sign_oangle_eq_zero Orientation.eq_zero_or_angle_eq_zero_or_pi_of_sign_oangle_eq_zero	Mathlib/Geometry/Euclidean/Angle/Oriented/Basic.lean	683	716	theorem oangle_eq_of_angle_eq_of_sign_eq {w x y z : V} (h : InnerProductGeometry.angle w x = InnerProductGeometry.angle y z) (hs : (o.oangle w x).sign = (o.oangle y z).sign) : o.oangle w x = o.oangle y z := by	by_cases h0 : (w = 0 ∨ x = 0) ∨ y = 0 ∨ z = 0 · have hs' : (o.oangle w x).sign = 0 ∧ (o.oangle y z).sign = 0 := by rcases h0 with ((rfl \| rfl) \| rfl \| rfl) · simpa using hs.symm · simpa using hs.symm · simpa using hs · simpa using hs rcases hs' with ⟨hswx, hsyz⟩ have h' : InnerProductGeometry.angle w x = π / 2 ∧ InnerProductGeometry.angle y z = π / 2 := by rcases h0 with ((rfl \| rfl) \| rfl \| rfl) · simpa using h.symm · simpa using h.symm · simpa using h · simpa using h rcases h' with ⟨hwx, hyz⟩ have hpi : π / 2 ≠ π := by intro hpi rw [div_eq_iff, eq_comm, ← sub_eq_zero, mul_two, add_sub_cancel_right] at hpi · exact Real.pi_pos.ne.symm hpi · exact two_ne_zero have h0wx : w = 0 ∨ x = 0 := by have h0' := o.eq_zero_or_angle_eq_zero_or_pi_of_sign_oangle_eq_zero hswx simpa [hwx, Real.pi_pos.ne.symm, hpi] using h0' have h0yz : y = 0 ∨ z = 0 := by have h0' := o.eq_zero_or_angle_eq_zero_or_pi_of_sign_oangle_eq_zero hsyz simpa [hyz, Real.pi_pos.ne.symm, hpi] using h0' rcases h0wx with (h0wx \| h0wx) <;> rcases h0yz with (h0yz \| h0yz) <;> simp [h0wx, h0yz] · push_neg at h0 rw [Real.Angle.eq_iff_abs_toReal_eq_of_sign_eq hs] rwa [o.angle_eq_abs_oangle_toReal h0.1.1 h0.1.2, o.angle_eq_abs_oangle_toReal h0.2.1 h0.2.2] at h
import Mathlib.Algebra.CharZero.Lemmas import Mathlib.Algebra.GroupWithZero.Divisibility import Mathlib.Data.Real.Basic import Mathlib.Data.Set.Image #align_import data.complex.basic from "leanprover-community/mathlib"@"31c24aa72e7b3e5ed97a8412470e904f82b81004" open Set Function structure Complex : Type where re : ℝ im : ℝ #align complex Complex @[inherit_doc] notation "ℂ" => Complex namespace Complex open ComplexConjugate noncomputable instance : DecidableEq ℂ := Classical.decEq _ @[simps apply] def equivRealProd : ℂ ≃ ℝ × ℝ where toFun z := ⟨z.re, z.im⟩ invFun p := ⟨p.1, p.2⟩ left_inv := fun ⟨_, _⟩ => rfl right_inv := fun ⟨_, _⟩ => rfl #align complex.equiv_real_prod Complex.equivRealProd @[simp] theorem eta : ∀ z : ℂ, Complex.mk z.re z.im = z \| ⟨_, _⟩ => rfl #align complex.eta Complex.eta -- We only mark this lemma with `ext` locally to avoid it applying whenever terms of `ℂ` appear. theorem ext : ∀ {z w : ℂ}, z.re = w.re → z.im = w.im → z = w \| ⟨_, _⟩, ⟨_, _⟩, rfl, rfl => rfl #align complex.ext Complex.ext attribute [local ext] Complex.ext theorem ext_iff {z w : ℂ} : z = w ↔ z.re = w.re ∧ z.im = w.im := ⟨fun H => by simp [H], fun h => ext h.1 h.2⟩ #align complex.ext_iff Complex.ext_iff theorem re_surjective : Surjective re := fun x => ⟨⟨x, 0⟩, rfl⟩ #align complex.re_surjective Complex.re_surjective theorem im_surjective : Surjective im := fun y => ⟨⟨0, y⟩, rfl⟩ #align complex.im_surjective Complex.im_surjective @[simp] theorem range_re : range re = univ := re_surjective.range_eq #align complex.range_re Complex.range_re @[simp] theorem range_im : range im = univ := im_surjective.range_eq #align complex.range_im Complex.range_im -- Porting note: refactored instance to allow `norm_cast` to work @[coe] def ofReal' (r : ℝ) : ℂ := ⟨r, 0⟩ instance : Coe ℝ ℂ := ⟨ofReal'⟩ @[simp, norm_cast] theorem ofReal_re (r : ℝ) : Complex.re (r : ℂ) = r := rfl #align complex.of_real_re Complex.ofReal_re @[simp, norm_cast] theorem ofReal_im (r : ℝ) : (r : ℂ).im = 0 := rfl #align complex.of_real_im Complex.ofReal_im theorem ofReal_def (r : ℝ) : (r : ℂ) = ⟨r, 0⟩ := rfl #align complex.of_real_def Complex.ofReal_def @[simp, norm_cast] theorem ofReal_inj {z w : ℝ} : (z : ℂ) = w ↔ z = w := ⟨congrArg re, by apply congrArg⟩ #align complex.of_real_inj Complex.ofReal_inj -- Porting note: made coercion explicit theorem ofReal_injective : Function.Injective ((↑) : ℝ → ℂ) := fun _ _ => congrArg re #align complex.of_real_injective Complex.ofReal_injective -- Porting note: made coercion explicit instance canLift : CanLift ℂ ℝ (↑) fun z => z.im = 0 where prf z hz := ⟨z.re, ext rfl hz.symm⟩ #align complex.can_lift Complex.canLift def Set.reProdIm (s t : Set ℝ) : Set ℂ := re ⁻¹' s ∩ im ⁻¹' t #align set.re_prod_im Complex.Set.reProdIm @[inherit_doc] infixl:72 " ×ℂ " => Set.reProdIm theorem mem_reProdIm {z : ℂ} {s t : Set ℝ} : z ∈ s ×ℂ t ↔ z.re ∈ s ∧ z.im ∈ t := Iff.rfl #align complex.mem_re_prod_im Complex.mem_reProdIm instance : Zero ℂ := ⟨(0 : ℝ)⟩ instance : Inhabited ℂ := ⟨0⟩ @[simp] theorem zero_re : (0 : ℂ).re = 0 := rfl #align complex.zero_re Complex.zero_re @[simp] theorem zero_im : (0 : ℂ).im = 0 := rfl #align complex.zero_im Complex.zero_im @[simp, norm_cast] theorem ofReal_zero : ((0 : ℝ) : ℂ) = 0 := rfl #align complex.of_real_zero Complex.ofReal_zero @[simp] theorem ofReal_eq_zero {z : ℝ} : (z : ℂ) = 0 ↔ z = 0 := ofReal_inj #align complex.of_real_eq_zero Complex.ofReal_eq_zero theorem ofReal_ne_zero {z : ℝ} : (z : ℂ) ≠ 0 ↔ z ≠ 0 := not_congr ofReal_eq_zero #align complex.of_real_ne_zero Complex.ofReal_ne_zero instance : One ℂ := ⟨(1 : ℝ)⟩ @[simp] theorem one_re : (1 : ℂ).re = 1 := rfl #align complex.one_re Complex.one_re @[simp] theorem one_im : (1 : ℂ).im = 0 := rfl #align complex.one_im Complex.one_im @[simp, norm_cast] theorem ofReal_one : ((1 : ℝ) : ℂ) = 1 := rfl #align complex.of_real_one Complex.ofReal_one @[simp] theorem ofReal_eq_one {z : ℝ} : (z : ℂ) = 1 ↔ z = 1 := ofReal_inj #align complex.of_real_eq_one Complex.ofReal_eq_one theorem ofReal_ne_one {z : ℝ} : (z : ℂ) ≠ 1 ↔ z ≠ 1 := not_congr ofReal_eq_one #align complex.of_real_ne_one Complex.ofReal_ne_one instance : Add ℂ := ⟨fun z w => ⟨z.re + w.re, z.im + w.im⟩⟩ @[simp] theorem add_re (z w : ℂ) : (z + w).re = z.re + w.re := rfl #align complex.add_re Complex.add_re @[simp] theorem add_im (z w : ℂ) : (z + w).im = z.im + w.im := rfl #align complex.add_im Complex.add_im -- replaced by `re_ofNat` #noalign complex.bit0_re #noalign complex.bit1_re -- replaced by `im_ofNat` #noalign complex.bit0_im #noalign complex.bit1_im @[simp, norm_cast] theorem ofReal_add (r s : ℝ) : ((r + s : ℝ) : ℂ) = r + s := ext_iff.2 <\| by simp [ofReal'] #align complex.of_real_add Complex.ofReal_add -- replaced by `Complex.ofReal_ofNat` #noalign complex.of_real_bit0 #noalign complex.of_real_bit1 instance : Neg ℂ := ⟨fun z => ⟨-z.re, -z.im⟩⟩ @[simp] theorem neg_re (z : ℂ) : (-z).re = -z.re := rfl #align complex.neg_re Complex.neg_re @[simp] theorem neg_im (z : ℂ) : (-z).im = -z.im := rfl #align complex.neg_im Complex.neg_im @[simp, norm_cast] theorem ofReal_neg (r : ℝ) : ((-r : ℝ) : ℂ) = -r := ext_iff.2 <\| by simp [ofReal'] #align complex.of_real_neg Complex.ofReal_neg instance : Sub ℂ := ⟨fun z w => ⟨z.re - w.re, z.im - w.im⟩⟩ instance : Mul ℂ := ⟨fun z w => ⟨z.re * w.re - z.im * w.im, z.re * w.im + z.im * w.re⟩⟩ @[simp] theorem mul_re (z w : ℂ) : (z * w).re = z.re * w.re - z.im * w.im := rfl #align complex.mul_re Complex.mul_re @[simp] theorem mul_im (z w : ℂ) : (z * w).im = z.re * w.im + z.im * w.re := rfl #align complex.mul_im Complex.mul_im @[simp, norm_cast] theorem ofReal_mul (r s : ℝ) : ((r * s : ℝ) : ℂ) = r * s := ext_iff.2 <\| by simp [ofReal'] #align complex.of_real_mul Complex.ofReal_mul theorem re_ofReal_mul (r : ℝ) (z : ℂ) : (r * z).re = r * z.re := by simp [ofReal'] #align complex.of_real_mul_re Complex.re_ofReal_mul theorem im_ofReal_mul (r : ℝ) (z : ℂ) : (r * z).im = r * z.im := by simp [ofReal'] #align complex.of_real_mul_im Complex.im_ofReal_mul lemma re_mul_ofReal (z : ℂ) (r : ℝ) : (z * r).re = z.re * r := by simp [ofReal'] lemma im_mul_ofReal (z : ℂ) (r : ℝ) : (z * r).im = z.im * r := by simp [ofReal'] theorem ofReal_mul' (r : ℝ) (z : ℂ) : ↑r * z = ⟨r * z.re, r * z.im⟩ := ext (re_ofReal_mul _ _) (im_ofReal_mul _ _) #align complex.of_real_mul' Complex.ofReal_mul' def I : ℂ := ⟨0, 1⟩ set_option linter.uppercaseLean3 false in #align complex.I Complex.I @[simp] theorem I_re : I.re = 0 := rfl set_option linter.uppercaseLean3 false in #align complex.I_re Complex.I_re @[simp] theorem I_im : I.im = 1 := rfl set_option linter.uppercaseLean3 false in #align complex.I_im Complex.I_im @[simp] theorem I_mul_I : I * I = -1 := ext_iff.2 <\| by simp set_option linter.uppercaseLean3 false in #align complex.I_mul_I Complex.I_mul_I theorem I_mul (z : ℂ) : I * z = ⟨-z.im, z.re⟩ := ext_iff.2 <\| by simp set_option linter.uppercaseLean3 false in #align complex.I_mul Complex.I_mul @[simp] lemma I_ne_zero : (I : ℂ) ≠ 0 := mt (congr_arg im) zero_ne_one.symm set_option linter.uppercaseLean3 false in #align complex.I_ne_zero Complex.I_ne_zero theorem mk_eq_add_mul_I (a b : ℝ) : Complex.mk a b = a + b * I := ext_iff.2 <\| by simp [ofReal'] set_option linter.uppercaseLean3 false in #align complex.mk_eq_add_mul_I Complex.mk_eq_add_mul_I @[simp] theorem re_add_im (z : ℂ) : (z.re : ℂ) + z.im * I = z := ext_iff.2 <\| by simp [ofReal'] #align complex.re_add_im Complex.re_add_im	Mathlib/Data/Complex/Basic.lean	318	318	theorem mul_I_re (z : ℂ) : (z * I).re = -z.im := by	simp
import Mathlib.Topology.Sets.Opens #align_import topology.local_at_target from "leanprover-community/mathlib"@"f2ce6086713c78a7f880485f7917ea547a215982" open TopologicalSpace Set Filter open Topology Filter variable {α β : Type} [TopologicalSpace α] [TopologicalSpace β] {f : α → β} variable {s : Set β} {ι : Type} {U : ι → Opens β} (hU : iSup U = ⊤) theorem Set.restrictPreimage_inducing (s : Set β) (h : Inducing f) : Inducing (s.restrictPreimage f) := by simp_rw [← inducing_subtype_val.of_comp_iff, inducing_iff_nhds, restrictPreimage, MapsTo.coe_restrict, restrict_eq, ← @Filter.comap_comap _ _ _ _ _ f, Function.comp_apply] at h ⊢ intro a rw [← h, ← inducing_subtype_val.nhds_eq_comap] #align set.restrict_preimage_inducing Set.restrictPreimage_inducing alias Inducing.restrictPreimage := Set.restrictPreimage_inducing #align inducing.restrict_preimage Inducing.restrictPreimage theorem Set.restrictPreimage_embedding (s : Set β) (h : Embedding f) : Embedding (s.restrictPreimage f) := ⟨h.1.restrictPreimage s, h.2.restrictPreimage s⟩ #align set.restrict_preimage_embedding Set.restrictPreimage_embedding alias Embedding.restrictPreimage := Set.restrictPreimage_embedding #align embedding.restrict_preimage Embedding.restrictPreimage theorem Set.restrictPreimage_openEmbedding (s : Set β) (h : OpenEmbedding f) : OpenEmbedding (s.restrictPreimage f) := ⟨h.1.restrictPreimage s, (s.range_restrictPreimage f).symm ▸ continuous_subtype_val.isOpen_preimage _ h.isOpen_range⟩ #align set.restrict_preimage_open_embedding Set.restrictPreimage_openEmbedding alias OpenEmbedding.restrictPreimage := Set.restrictPreimage_openEmbedding #align open_embedding.restrict_preimage OpenEmbedding.restrictPreimage theorem Set.restrictPreimage_closedEmbedding (s : Set β) (h : ClosedEmbedding f) : ClosedEmbedding (s.restrictPreimage f) := ⟨h.1.restrictPreimage s, (s.range_restrictPreimage f).symm ▸ inducing_subtype_val.isClosed_preimage _ h.isClosed_range⟩ #align set.restrict_preimage_closed_embedding Set.restrictPreimage_closedEmbedding alias ClosedEmbedding.restrictPreimage := Set.restrictPreimage_closedEmbedding #align closed_embedding.restrict_preimage ClosedEmbedding.restrictPreimage theorem IsClosedMap.restrictPreimage (H : IsClosedMap f) (s : Set β) : IsClosedMap (s.restrictPreimage f) := by intro t suffices ∀ u, IsClosed u → Subtype.val ⁻¹' u = t → ∃ v, IsClosed v ∧ Subtype.val ⁻¹' v = s.restrictPreimage f '' t by simpa [isClosed_induced_iff] exact fun u hu e => ⟨f '' u, H u hu, by simp [← e, image_restrictPreimage]⟩ @[deprecated (since := "2024-04-02")] theorem Set.restrictPreimage_isClosedMap (s : Set β) (H : IsClosedMap f) : IsClosedMap (s.restrictPreimage f) := H.restrictPreimage s theorem IsOpenMap.restrictPreimage (H : IsOpenMap f) (s : Set β) : IsOpenMap (s.restrictPreimage f) := by intro t suffices ∀ u, IsOpen u → Subtype.val ⁻¹' u = t → ∃ v, IsOpen v ∧ Subtype.val ⁻¹' v = s.restrictPreimage f '' t by simpa [isOpen_induced_iff] exact fun u hu e => ⟨f '' u, H u hu, by simp [← e, image_restrictPreimage]⟩ @[deprecated (since := "2024-04-02")] theorem Set.restrictPreimage_isOpenMap (s : Set β) (H : IsOpenMap f) : IsOpenMap (s.restrictPreimage f) := H.restrictPreimage s theorem isOpen_iff_inter_of_iSup_eq_top (s : Set β) : IsOpen s ↔ ∀ i, IsOpen (s ∩ U i) := by constructor · exact fun H i => H.inter (U i).2 · intro H have : ⋃ i, (U i : Set β) = Set.univ := by convert congr_arg (SetLike.coe) hU simp rw [← s.inter_univ, ← this, Set.inter_iUnion] exact isOpen_iUnion H #align is_open_iff_inter_of_supr_eq_top isOpen_iff_inter_of_iSup_eq_top	Mathlib/Topology/LocalAtTarget.lean	101	108	theorem isOpen_iff_coe_preimage_of_iSup_eq_top (s : Set β) : IsOpen s ↔ ∀ i, IsOpen ((↑) ⁻¹' s : Set (U i)) := by	-- Porting note: rewrote to avoid ´simp´ issues rw [isOpen_iff_inter_of_iSup_eq_top hU s] refine forall_congr' fun i => ?_ rw [(U _).2.openEmbedding_subtype_val.open_iff_image_open] erw [Set.image_preimage_eq_inter_range] rw [Subtype.range_coe, Opens.carrier_eq_coe]
import Mathlib.Order.Interval.Multiset #align_import data.nat.interval from "leanprover-community/mathlib"@"1d29de43a5ba4662dd33b5cfeecfc2a27a5a8a29" -- TODO -- assert_not_exists Ring open Finset Nat variable (a b c : ℕ) namespace Nat instance instLocallyFiniteOrder : LocallyFiniteOrder ℕ where finsetIcc a b := ⟨List.range' a (b + 1 - a), List.nodup_range' _ _⟩ finsetIco a b := ⟨List.range' a (b - a), List.nodup_range' _ _⟩ finsetIoc a b := ⟨List.range' (a + 1) (b - a), List.nodup_range' _ _⟩ finsetIoo a b := ⟨List.range' (a + 1) (b - a - 1), List.nodup_range' _ _⟩ finset_mem_Icc a b x := by rw [Finset.mem_mk, Multiset.mem_coe, List.mem_range'_1]; omega finset_mem_Ico a b x := by rw [Finset.mem_mk, Multiset.mem_coe, List.mem_range'_1]; omega finset_mem_Ioc a b x := by rw [Finset.mem_mk, Multiset.mem_coe, List.mem_range'_1]; omega finset_mem_Ioo a b x := by rw [Finset.mem_mk, Multiset.mem_coe, List.mem_range'_1]; omega theorem Icc_eq_range' : Icc a b = ⟨List.range' a (b + 1 - a), List.nodup_range' _ _⟩ := rfl #align nat.Icc_eq_range' Nat.Icc_eq_range' theorem Ico_eq_range' : Ico a b = ⟨List.range' a (b - a), List.nodup_range' _ _⟩ := rfl #align nat.Ico_eq_range' Nat.Ico_eq_range' theorem Ioc_eq_range' : Ioc a b = ⟨List.range' (a + 1) (b - a), List.nodup_range' _ _⟩ := rfl #align nat.Ioc_eq_range' Nat.Ioc_eq_range' theorem Ioo_eq_range' : Ioo a b = ⟨List.range' (a + 1) (b - a - 1), List.nodup_range' _ _⟩ := rfl #align nat.Ioo_eq_range' Nat.Ioo_eq_range' theorem uIcc_eq_range' : uIcc a b = ⟨List.range' (min a b) (max a b + 1 - min a b), List.nodup_range' _ _⟩ := rfl #align nat.uIcc_eq_range' Nat.uIcc_eq_range' theorem Iio_eq_range : Iio = range := by ext b x rw [mem_Iio, mem_range] #align nat.Iio_eq_range Nat.Iio_eq_range @[simp] theorem Ico_zero_eq_range : Ico 0 = range := by rw [← Nat.bot_eq_zero, ← Iio_eq_Ico, Iio_eq_range] #align nat.Ico_zero_eq_range Nat.Ico_zero_eq_range lemma range_eq_Icc_zero_sub_one (n : ℕ) (hn : n ≠ 0): range n = Icc 0 (n - 1) := by ext b simp_all only [mem_Icc, zero_le, true_and, mem_range] exact lt_iff_le_pred (zero_lt_of_ne_zero hn) theorem _root_.Finset.range_eq_Ico : range = Ico 0 := Ico_zero_eq_range.symm #align finset.range_eq_Ico Finset.range_eq_Ico @[simp] theorem card_Icc : (Icc a b).card = b + 1 - a := List.length_range' _ _ _ #align nat.card_Icc Nat.card_Icc @[simp] theorem card_Ico : (Ico a b).card = b - a := List.length_range' _ _ _ #align nat.card_Ico Nat.card_Ico @[simp] theorem card_Ioc : (Ioc a b).card = b - a := List.length_range' _ _ _ #align nat.card_Ioc Nat.card_Ioc @[simp] theorem card_Ioo : (Ioo a b).card = b - a - 1 := List.length_range' _ _ _ #align nat.card_Ioo Nat.card_Ioo @[simp] theorem card_uIcc : (uIcc a b).card = (b - a : ℤ).natAbs + 1 := (card_Icc _ _).trans $ by rw [← Int.natCast_inj, sup_eq_max, inf_eq_min, Int.ofNat_sub] <;> omega #align nat.card_uIcc Nat.card_uIcc @[simp] lemma card_Iic : (Iic b).card = b + 1 := by rw [Iic_eq_Icc, card_Icc, Nat.bot_eq_zero, Nat.sub_zero] #align nat.card_Iic Nat.card_Iic @[simp] theorem card_Iio : (Iio b).card = b := by rw [Iio_eq_Ico, card_Ico, Nat.bot_eq_zero, Nat.sub_zero] #align nat.card_Iio Nat.card_Iio -- Porting note (#10618): simp can prove this -- @[simp] theorem card_fintypeIcc : Fintype.card (Set.Icc a b) = b + 1 - a := by rw [Fintype.card_ofFinset, card_Icc] #align nat.card_fintype_Icc Nat.card_fintypeIcc -- Porting note (#10618): simp can prove this -- @[simp] theorem card_fintypeIco : Fintype.card (Set.Ico a b) = b - a := by rw [Fintype.card_ofFinset, card_Ico] #align nat.card_fintype_Ico Nat.card_fintypeIco -- Porting note (#10618): simp can prove this -- @[simp] theorem card_fintypeIoc : Fintype.card (Set.Ioc a b) = b - a := by rw [Fintype.card_ofFinset, card_Ioc] #align nat.card_fintype_Ioc Nat.card_fintypeIoc -- Porting note (#10618): simp can prove this -- @[simp] theorem card_fintypeIoo : Fintype.card (Set.Ioo a b) = b - a - 1 := by rw [Fintype.card_ofFinset, card_Ioo] #align nat.card_fintype_Ioo Nat.card_fintypeIoo -- Porting note (#10618): simp can prove this -- @[simp] theorem card_fintypeIic : Fintype.card (Set.Iic b) = b + 1 := by rw [Fintype.card_ofFinset, card_Iic] #align nat.card_fintype_Iic Nat.card_fintypeIic -- Porting note (#10618): simp can prove this -- @[simp] theorem card_fintypeIio : Fintype.card (Set.Iio b) = b := by rw [Fintype.card_ofFinset, card_Iio] #align nat.card_fintype_Iio Nat.card_fintypeIio -- TODO@Yaël: Generalize all the following lemmas to `SuccOrder` theorem Icc_succ_left : Icc a.succ b = Ioc a b := by ext x rw [mem_Icc, mem_Ioc, succ_le_iff] #align nat.Icc_succ_left Nat.Icc_succ_left theorem Ico_succ_right : Ico a b.succ = Icc a b := by ext x rw [mem_Ico, mem_Icc, Nat.lt_succ_iff] #align nat.Ico_succ_right Nat.Ico_succ_right theorem Ico_succ_left : Ico a.succ b = Ioo a b := by ext x rw [mem_Ico, mem_Ioo, succ_le_iff] #align nat.Ico_succ_left Nat.Ico_succ_left	Mathlib/Order/Interval/Finset/Nat.lean	163	165	theorem Icc_pred_right {b : ℕ} (h : 0 < b) : Icc a (b - 1) = Ico a b := by	ext x rw [mem_Icc, mem_Ico, lt_iff_le_pred h]
import Mathlib.Combinatorics.SimpleGraph.Subgraph import Mathlib.Data.List.Rotate #align_import combinatorics.simple_graph.connectivity from "leanprover-community/mathlib"@"b99e2d58a5e6861833fa8de11e51a81144258db4" open Function universe u v w namespace SimpleGraph variable {V : Type u} {V' : Type v} {V'' : Type w} variable (G : SimpleGraph V) (G' : SimpleGraph V') (G'' : SimpleGraph V'') inductive Walk : V → V → Type u \| nil {u : V} : Walk u u \| cons {u v w : V} (h : G.Adj u v) (p : Walk v w) : Walk u w deriving DecidableEq #align simple_graph.walk SimpleGraph.Walk attribute [refl] Walk.nil @[simps] instance Walk.instInhabited (v : V) : Inhabited (G.Walk v v) := ⟨Walk.nil⟩ #align simple_graph.walk.inhabited SimpleGraph.Walk.instInhabited @[match_pattern, reducible] def Adj.toWalk {G : SimpleGraph V} {u v : V} (h : G.Adj u v) : G.Walk u v := Walk.cons h Walk.nil #align simple_graph.adj.to_walk SimpleGraph.Adj.toWalk namespace Walk variable {G} @[match_pattern] abbrev nil' (u : V) : G.Walk u u := Walk.nil #align simple_graph.walk.nil' SimpleGraph.Walk.nil' @[match_pattern] abbrev cons' (u v w : V) (h : G.Adj u v) (p : G.Walk v w) : G.Walk u w := Walk.cons h p #align simple_graph.walk.cons' SimpleGraph.Walk.cons' protected def copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : G.Walk u' v' := hu ▸ hv ▸ p #align simple_graph.walk.copy SimpleGraph.Walk.copy @[simp] theorem copy_rfl_rfl {u v} (p : G.Walk u v) : p.copy rfl rfl = p := rfl #align simple_graph.walk.copy_rfl_rfl SimpleGraph.Walk.copy_rfl_rfl @[simp] theorem copy_copy {u v u' v' u'' v''} (p : G.Walk u v) (hu : u = u') (hv : v = v') (hu' : u' = u'') (hv' : v' = v'') : (p.copy hu hv).copy hu' hv' = p.copy (hu.trans hu') (hv.trans hv') := by subst_vars rfl #align simple_graph.walk.copy_copy SimpleGraph.Walk.copy_copy @[simp] theorem copy_nil {u u'} (hu : u = u') : (Walk.nil : G.Walk u u).copy hu hu = Walk.nil := by subst_vars rfl #align simple_graph.walk.copy_nil SimpleGraph.Walk.copy_nil theorem copy_cons {u v w u' w'} (h : G.Adj u v) (p : G.Walk v w) (hu : u = u') (hw : w = w') : (Walk.cons h p).copy hu hw = Walk.cons (hu ▸ h) (p.copy rfl hw) := by subst_vars rfl #align simple_graph.walk.copy_cons SimpleGraph.Walk.copy_cons @[simp] theorem cons_copy {u v w v' w'} (h : G.Adj u v) (p : G.Walk v' w') (hv : v' = v) (hw : w' = w) : Walk.cons h (p.copy hv hw) = (Walk.cons (hv ▸ h) p).copy rfl hw := by subst_vars rfl #align simple_graph.walk.cons_copy SimpleGraph.Walk.cons_copy theorem exists_eq_cons_of_ne {u v : V} (hne : u ≠ v) : ∀ (p : G.Walk u v), ∃ (w : V) (h : G.Adj u w) (p' : G.Walk w v), p = cons h p' \| nil => (hne rfl).elim \| cons h p' => ⟨_, h, p', rfl⟩ #align simple_graph.walk.exists_eq_cons_of_ne SimpleGraph.Walk.exists_eq_cons_of_ne def length {u v : V} : G.Walk u v → ℕ \| nil => 0 \| cons _ q => q.length.succ #align simple_graph.walk.length SimpleGraph.Walk.length @[trans] def append {u v w : V} : G.Walk u v → G.Walk v w → G.Walk u w \| nil, q => q \| cons h p, q => cons h (p.append q) #align simple_graph.walk.append SimpleGraph.Walk.append def concat {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : G.Walk u w := p.append (cons h nil) #align simple_graph.walk.concat SimpleGraph.Walk.concat theorem concat_eq_append {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : p.concat h = p.append (cons h nil) := rfl #align simple_graph.walk.concat_eq_append SimpleGraph.Walk.concat_eq_append protected def reverseAux {u v w : V} : G.Walk u v → G.Walk u w → G.Walk v w \| nil, q => q \| cons h p, q => Walk.reverseAux p (cons (G.symm h) q) #align simple_graph.walk.reverse_aux SimpleGraph.Walk.reverseAux @[symm] def reverse {u v : V} (w : G.Walk u v) : G.Walk v u := w.reverseAux nil #align simple_graph.walk.reverse SimpleGraph.Walk.reverse def getVert {u v : V} : G.Walk u v → ℕ → V \| nil, _ => u \| cons _ _, 0 => u \| cons _ q, n + 1 => q.getVert n #align simple_graph.walk.get_vert SimpleGraph.Walk.getVert @[simp] theorem getVert_zero {u v} (w : G.Walk u v) : w.getVert 0 = u := by cases w <;> rfl #align simple_graph.walk.get_vert_zero SimpleGraph.Walk.getVert_zero theorem getVert_of_length_le {u v} (w : G.Walk u v) {i : ℕ} (hi : w.length ≤ i) : w.getVert i = v := by induction w generalizing i with \| nil => rfl \| cons _ _ ih => cases i · cases hi · exact ih (Nat.succ_le_succ_iff.1 hi) #align simple_graph.walk.get_vert_of_length_le SimpleGraph.Walk.getVert_of_length_le @[simp] theorem getVert_length {u v} (w : G.Walk u v) : w.getVert w.length = v := w.getVert_of_length_le rfl.le #align simple_graph.walk.get_vert_length SimpleGraph.Walk.getVert_length theorem adj_getVert_succ {u v} (w : G.Walk u v) {i : ℕ} (hi : i < w.length) : G.Adj (w.getVert i) (w.getVert (i + 1)) := by induction w generalizing i with \| nil => cases hi \| cons hxy _ ih => cases i · simp [getVert, hxy] · exact ih (Nat.succ_lt_succ_iff.1 hi) #align simple_graph.walk.adj_get_vert_succ SimpleGraph.Walk.adj_getVert_succ @[simp] theorem cons_append {u v w x : V} (h : G.Adj u v) (p : G.Walk v w) (q : G.Walk w x) : (cons h p).append q = cons h (p.append q) := rfl #align simple_graph.walk.cons_append SimpleGraph.Walk.cons_append @[simp] theorem cons_nil_append {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : (cons h nil).append p = cons h p := rfl #align simple_graph.walk.cons_nil_append SimpleGraph.Walk.cons_nil_append @[simp] theorem append_nil {u v : V} (p : G.Walk u v) : p.append nil = p := by induction p with \| nil => rfl \| cons _ _ ih => rw [cons_append, ih] #align simple_graph.walk.append_nil SimpleGraph.Walk.append_nil @[simp] theorem nil_append {u v : V} (p : G.Walk u v) : nil.append p = p := rfl #align simple_graph.walk.nil_append SimpleGraph.Walk.nil_append theorem append_assoc {u v w x : V} (p : G.Walk u v) (q : G.Walk v w) (r : G.Walk w x) : p.append (q.append r) = (p.append q).append r := by induction p with \| nil => rfl \| cons h p' ih => dsimp only [append] rw [ih] #align simple_graph.walk.append_assoc SimpleGraph.Walk.append_assoc @[simp] theorem append_copy_copy {u v w u' v' w'} (p : G.Walk u v) (q : G.Walk v w) (hu : u = u') (hv : v = v') (hw : w = w') : (p.copy hu hv).append (q.copy hv hw) = (p.append q).copy hu hw := by subst_vars rfl #align simple_graph.walk.append_copy_copy SimpleGraph.Walk.append_copy_copy theorem concat_nil {u v : V} (h : G.Adj u v) : nil.concat h = cons h nil := rfl #align simple_graph.walk.concat_nil SimpleGraph.Walk.concat_nil @[simp] theorem concat_cons {u v w x : V} (h : G.Adj u v) (p : G.Walk v w) (h' : G.Adj w x) : (cons h p).concat h' = cons h (p.concat h') := rfl #align simple_graph.walk.concat_cons SimpleGraph.Walk.concat_cons theorem append_concat {u v w x : V} (p : G.Walk u v) (q : G.Walk v w) (h : G.Adj w x) : p.append (q.concat h) = (p.append q).concat h := append_assoc _ _ _ #align simple_graph.walk.append_concat SimpleGraph.Walk.append_concat theorem concat_append {u v w x : V} (p : G.Walk u v) (h : G.Adj v w) (q : G.Walk w x) : (p.concat h).append q = p.append (cons h q) := by rw [concat_eq_append, ← append_assoc, cons_nil_append] #align simple_graph.walk.concat_append SimpleGraph.Walk.concat_append theorem exists_cons_eq_concat {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : ∃ (x : V) (q : G.Walk u x) (h' : G.Adj x w), cons h p = q.concat h' := by induction p generalizing u with \| nil => exact ⟨_, nil, h, rfl⟩ \| cons h' p ih => obtain ⟨y, q, h'', hc⟩ := ih h' refine ⟨y, cons h q, h'', ?_⟩ rw [concat_cons, hc] #align simple_graph.walk.exists_cons_eq_concat SimpleGraph.Walk.exists_cons_eq_concat theorem exists_concat_eq_cons {u v w : V} : ∀ (p : G.Walk u v) (h : G.Adj v w), ∃ (x : V) (h' : G.Adj u x) (q : G.Walk x w), p.concat h = cons h' q \| nil, h => ⟨_, h, nil, rfl⟩ \| cons h' p, h => ⟨_, h', Walk.concat p h, concat_cons _ _ _⟩ #align simple_graph.walk.exists_concat_eq_cons SimpleGraph.Walk.exists_concat_eq_cons @[simp] theorem reverse_nil {u : V} : (nil : G.Walk u u).reverse = nil := rfl #align simple_graph.walk.reverse_nil SimpleGraph.Walk.reverse_nil theorem reverse_singleton {u v : V} (h : G.Adj u v) : (cons h nil).reverse = cons (G.symm h) nil := rfl #align simple_graph.walk.reverse_singleton SimpleGraph.Walk.reverse_singleton @[simp] theorem cons_reverseAux {u v w x : V} (p : G.Walk u v) (q : G.Walk w x) (h : G.Adj w u) : (cons h p).reverseAux q = p.reverseAux (cons (G.symm h) q) := rfl #align simple_graph.walk.cons_reverse_aux SimpleGraph.Walk.cons_reverseAux @[simp] protected theorem append_reverseAux {u v w x : V} (p : G.Walk u v) (q : G.Walk v w) (r : G.Walk u x) : (p.append q).reverseAux r = q.reverseAux (p.reverseAux r) := by induction p with \| nil => rfl \| cons h _ ih => exact ih q (cons (G.symm h) r) #align simple_graph.walk.append_reverse_aux SimpleGraph.Walk.append_reverseAux @[simp] protected theorem reverseAux_append {u v w x : V} (p : G.Walk u v) (q : G.Walk u w) (r : G.Walk w x) : (p.reverseAux q).append r = p.reverseAux (q.append r) := by induction p with \| nil => rfl \| cons h _ ih => simp [ih (cons (G.symm h) q)] #align simple_graph.walk.reverse_aux_append SimpleGraph.Walk.reverseAux_append protected theorem reverseAux_eq_reverse_append {u v w : V} (p : G.Walk u v) (q : G.Walk u w) : p.reverseAux q = p.reverse.append q := by simp [reverse] #align simple_graph.walk.reverse_aux_eq_reverse_append SimpleGraph.Walk.reverseAux_eq_reverse_append @[simp] theorem reverse_cons {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : (cons h p).reverse = p.reverse.append (cons (G.symm h) nil) := by simp [reverse] #align simple_graph.walk.reverse_cons SimpleGraph.Walk.reverse_cons @[simp] theorem reverse_copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : (p.copy hu hv).reverse = p.reverse.copy hv hu := by subst_vars rfl #align simple_graph.walk.reverse_copy SimpleGraph.Walk.reverse_copy @[simp] theorem reverse_append {u v w : V} (p : G.Walk u v) (q : G.Walk v w) : (p.append q).reverse = q.reverse.append p.reverse := by simp [reverse] #align simple_graph.walk.reverse_append SimpleGraph.Walk.reverse_append @[simp] theorem reverse_concat {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : (p.concat h).reverse = cons (G.symm h) p.reverse := by simp [concat_eq_append] #align simple_graph.walk.reverse_concat SimpleGraph.Walk.reverse_concat @[simp] theorem reverse_reverse {u v : V} (p : G.Walk u v) : p.reverse.reverse = p := by induction p with \| nil => rfl \| cons _ _ ih => simp [ih] #align simple_graph.walk.reverse_reverse SimpleGraph.Walk.reverse_reverse @[simp] theorem length_nil {u : V} : (nil : G.Walk u u).length = 0 := rfl #align simple_graph.walk.length_nil SimpleGraph.Walk.length_nil @[simp] theorem length_cons {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : (cons h p).length = p.length + 1 := rfl #align simple_graph.walk.length_cons SimpleGraph.Walk.length_cons @[simp] theorem length_copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : (p.copy hu hv).length = p.length := by subst_vars rfl #align simple_graph.walk.length_copy SimpleGraph.Walk.length_copy @[simp] theorem length_append {u v w : V} (p : G.Walk u v) (q : G.Walk v w) : (p.append q).length = p.length + q.length := by induction p with \| nil => simp \| cons _ _ ih => simp [ih, add_comm, add_left_comm, add_assoc] #align simple_graph.walk.length_append SimpleGraph.Walk.length_append @[simp] theorem length_concat {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : (p.concat h).length = p.length + 1 := length_append _ _ #align simple_graph.walk.length_concat SimpleGraph.Walk.length_concat @[simp] protected theorem length_reverseAux {u v w : V} (p : G.Walk u v) (q : G.Walk u w) : (p.reverseAux q).length = p.length + q.length := by induction p with \| nil => simp! \| cons _ _ ih => simp [ih, Nat.succ_add, Nat.add_assoc] #align simple_graph.walk.length_reverse_aux SimpleGraph.Walk.length_reverseAux @[simp] theorem length_reverse {u v : V} (p : G.Walk u v) : p.reverse.length = p.length := by simp [reverse] #align simple_graph.walk.length_reverse SimpleGraph.Walk.length_reverse theorem eq_of_length_eq_zero {u v : V} : ∀ {p : G.Walk u v}, p.length = 0 → u = v \| nil, _ => rfl #align simple_graph.walk.eq_of_length_eq_zero SimpleGraph.Walk.eq_of_length_eq_zero theorem adj_of_length_eq_one {u v : V} : ∀ {p : G.Walk u v}, p.length = 1 → G.Adj u v \| cons h nil, _ => h @[simp] theorem exists_length_eq_zero_iff {u v : V} : (∃ p : G.Walk u v, p.length = 0) ↔ u = v := by constructor · rintro ⟨p, hp⟩ exact eq_of_length_eq_zero hp · rintro rfl exact ⟨nil, rfl⟩ #align simple_graph.walk.exists_length_eq_zero_iff SimpleGraph.Walk.exists_length_eq_zero_iff @[simp] theorem length_eq_zero_iff {u : V} {p : G.Walk u u} : p.length = 0 ↔ p = nil := by cases p <;> simp #align simple_graph.walk.length_eq_zero_iff SimpleGraph.Walk.length_eq_zero_iff theorem getVert_append {u v w : V} (p : G.Walk u v) (q : G.Walk v w) (i : ℕ) : (p.append q).getVert i = if i < p.length then p.getVert i else q.getVert (i - p.length) := by induction p generalizing i with \| nil => simp \| cons h p ih => cases i <;> simp [getVert, ih, Nat.succ_lt_succ_iff] theorem getVert_reverse {u v : V} (p : G.Walk u v) (i : ℕ) : p.reverse.getVert i = p.getVert (p.length - i) := by induction p with \| nil => rfl \| cons h p ih => simp only [reverse_cons, getVert_append, length_reverse, ih, length_cons] split_ifs next hi => rw [Nat.succ_sub hi.le] simp [getVert] next hi => obtain rfl \| hi' := Nat.eq_or_lt_of_not_lt hi · simp [getVert] · rw [Nat.eq_add_of_sub_eq (Nat.sub_pos_of_lt hi') rfl, Nat.sub_eq_zero_of_le hi'] simp [getVert] theorem concat_ne_nil {u v : V} (p : G.Walk u v) (h : G.Adj v u) : p.concat h ≠ nil := by cases p <;> simp [concat] #align simple_graph.walk.concat_ne_nil SimpleGraph.Walk.concat_ne_nil theorem concat_inj {u v v' w : V} {p : G.Walk u v} {h : G.Adj v w} {p' : G.Walk u v'} {h' : G.Adj v' w} (he : p.concat h = p'.concat h') : ∃ hv : v = v', p.copy rfl hv = p' := by induction p with \| nil => cases p' · exact ⟨rfl, rfl⟩ · exfalso simp only [concat_nil, concat_cons, cons.injEq] at he obtain ⟨rfl, he⟩ := he simp only [heq_iff_eq] at he exact concat_ne_nil _ _ he.symm \| cons _ _ ih => rw [concat_cons] at he cases p' · exfalso simp only [concat_nil, cons.injEq] at he obtain ⟨rfl, he⟩ := he rw [heq_iff_eq] at he exact concat_ne_nil _ _ he · rw [concat_cons, cons.injEq] at he obtain ⟨rfl, he⟩ := he rw [heq_iff_eq] at he obtain ⟨rfl, rfl⟩ := ih he exact ⟨rfl, rfl⟩ #align simple_graph.walk.concat_inj SimpleGraph.Walk.concat_inj def support {u v : V} : G.Walk u v → List V \| nil => [u] \| cons _ p => u :: p.support #align simple_graph.walk.support SimpleGraph.Walk.support def darts {u v : V} : G.Walk u v → List G.Dart \| nil => [] \| cons h p => ⟨(u, _), h⟩ :: p.darts #align simple_graph.walk.darts SimpleGraph.Walk.darts def edges {u v : V} (p : G.Walk u v) : List (Sym2 V) := p.darts.map Dart.edge #align simple_graph.walk.edges SimpleGraph.Walk.edges @[simp] theorem support_nil {u : V} : (nil : G.Walk u u).support = [u] := rfl #align simple_graph.walk.support_nil SimpleGraph.Walk.support_nil @[simp] theorem support_cons {u v w : V} (h : G.Adj u v) (p : G.Walk v w) : (cons h p).support = u :: p.support := rfl #align simple_graph.walk.support_cons SimpleGraph.Walk.support_cons @[simp] theorem support_concat {u v w : V} (p : G.Walk u v) (h : G.Adj v w) : (p.concat h).support = p.support.concat w := by induction p <;> simp [*, concat_nil] #align simple_graph.walk.support_concat SimpleGraph.Walk.support_concat @[simp]	Mathlib/Combinatorics/SimpleGraph/Connectivity.lean	562	565	theorem support_copy {u v u' v'} (p : G.Walk u v) (hu : u = u') (hv : v = v') : (p.copy hu hv).support = p.support := by	subst_vars rfl
import Mathlib.Logic.Function.Basic import Mathlib.Logic.Relator import Mathlib.Init.Data.Quot import Mathlib.Tactic.Cases import Mathlib.Tactic.Use import Mathlib.Tactic.MkIffOfInductiveProp import Mathlib.Tactic.SimpRw #align_import logic.relation from "leanprover-community/mathlib"@"3365b20c2ffa7c35e47e5209b89ba9abdddf3ffe" open Function variable {α β γ δ ε ζ : Type*} namespace Relation variable {r : α → α → Prop} {a b c d : α} @[mk_iff ReflTransGen.cases_tail_iff] inductive ReflTransGen (r : α → α → Prop) (a : α) : α → Prop \| refl : ReflTransGen r a a \| tail {b c} : ReflTransGen r a b → r b c → ReflTransGen r a c #align relation.refl_trans_gen Relation.ReflTransGen #align relation.refl_trans_gen.cases_tail_iff Relation.ReflTransGen.cases_tail_iff attribute [refl] ReflTransGen.refl @[mk_iff] inductive ReflGen (r : α → α → Prop) (a : α) : α → Prop \| refl : ReflGen r a a \| single {b} : r a b → ReflGen r a b #align relation.refl_gen Relation.ReflGen #align relation.refl_gen_iff Relation.reflGen_iff @[mk_iff] inductive TransGen (r : α → α → Prop) (a : α) : α → Prop \| single {b} : r a b → TransGen r a b \| tail {b c} : TransGen r a b → r b c → TransGen r a c #align relation.trans_gen Relation.TransGen #align relation.trans_gen_iff Relation.transGen_iff attribute [refl] ReflGen.refl namespace ReflTransGen @[trans] theorem trans (hab : ReflTransGen r a b) (hbc : ReflTransGen r b c) : ReflTransGen r a c := by induction hbc with \| refl => assumption \| tail _ hcd hac => exact hac.tail hcd #align relation.refl_trans_gen.trans Relation.ReflTransGen.trans theorem single (hab : r a b) : ReflTransGen r a b := refl.tail hab #align relation.refl_trans_gen.single Relation.ReflTransGen.single theorem head (hab : r a b) (hbc : ReflTransGen r b c) : ReflTransGen r a c := by induction hbc with \| refl => exact refl.tail hab \| tail _ hcd hac => exact hac.tail hcd #align relation.refl_trans_gen.head Relation.ReflTransGen.head theorem symmetric (h : Symmetric r) : Symmetric (ReflTransGen r) := by intro x y h induction' h with z w _ b c · rfl · apply Relation.ReflTransGen.head (h b) c #align relation.refl_trans_gen.symmetric Relation.ReflTransGen.symmetric theorem cases_tail : ReflTransGen r a b → b = a ∨ ∃ c, ReflTransGen r a c ∧ r c b := (cases_tail_iff r a b).1 #align relation.refl_trans_gen.cases_tail Relation.ReflTransGen.cases_tail @[elab_as_elim] theorem head_induction_on {P : ∀ a : α, ReflTransGen r a b → Prop} {a : α} (h : ReflTransGen r a b) (refl : P b refl) (head : ∀ {a c} (h' : r a c) (h : ReflTransGen r c b), P c h → P a (h.head h')) : P a h := by induction h with \| refl => exact refl \| @tail b c _ hbc ih => apply ih · exact head hbc _ refl · exact fun h1 h2 ↦ head h1 (h2.tail hbc) #align relation.refl_trans_gen.head_induction_on Relation.ReflTransGen.head_induction_on @[elab_as_elim]	Mathlib/Logic/Relation.lean	336	342	theorem trans_induction_on {P : ∀ {a b : α}, ReflTransGen r a b → Prop} {a b : α} (h : ReflTransGen r a b) (ih₁ : ∀ a, @P a a refl) (ih₂ : ∀ {a b} (h : r a b), P (single h)) (ih₃ : ∀ {a b c} (h₁ : ReflTransGen r a b) (h₂ : ReflTransGen r b c), P h₁ → P h₂ → P (h₁.trans h₂)) : P h := by	induction h with \| refl => exact ih₁ a \| tail hab hbc ih => exact ih₃ hab (single hbc) ih (ih₂ hbc)
import Mathlib.AlgebraicGeometry.Restrict import Mathlib.CategoryTheory.Adjunction.Limits import Mathlib.CategoryTheory.Adjunction.Reflective #align_import algebraic_geometry.Gamma_Spec_adjunction from "leanprover-community/mathlib"@"d39590fc8728fbf6743249802486f8c91ffe07bc" -- Explicit universe annotations were used in this file to improve perfomance #12737 set_option linter.uppercaseLean3 false noncomputable section universe u open PrimeSpectrum namespace AlgebraicGeometry open Opposite open CategoryTheory open StructureSheaf open Spec (structureSheaf) open TopologicalSpace open AlgebraicGeometry.LocallyRingedSpace open TopCat.Presheaf open TopCat.Presheaf.SheafCondition namespace LocallyRingedSpace variable (X : LocallyRingedSpace.{u}) def ΓToStalk (x : X) : Γ.obj (op X) ⟶ X.presheaf.stalk x := X.presheaf.germ (⟨x, trivial⟩ : (⊤ : Opens X)) #align algebraic_geometry.LocallyRingedSpace.Γ_to_stalk AlgebraicGeometry.LocallyRingedSpace.ΓToStalk def toΓSpecFun : X → PrimeSpectrum (Γ.obj (op X)) := fun x => comap (X.ΓToStalk x) (LocalRing.closedPoint (X.presheaf.stalk x)) #align algebraic_geometry.LocallyRingedSpace.to_Γ_Spec_fun AlgebraicGeometry.LocallyRingedSpace.toΓSpecFun theorem not_mem_prime_iff_unit_in_stalk (r : Γ.obj (op X)) (x : X) : r ∉ (X.toΓSpecFun x).asIdeal ↔ IsUnit (X.ΓToStalk x r) := by erw [LocalRing.mem_maximalIdeal, Classical.not_not] #align algebraic_geometry.LocallyRingedSpace.not_mem_prime_iff_unit_in_stalk AlgebraicGeometry.LocallyRingedSpace.not_mem_prime_iff_unit_in_stalk theorem toΓSpec_preim_basicOpen_eq (r : Γ.obj (op X)) : X.toΓSpecFun ⁻¹' (basicOpen r).1 = (X.toRingedSpace.basicOpen r).1 := by ext erw [X.toRingedSpace.mem_top_basicOpen]; apply not_mem_prime_iff_unit_in_stalk #align algebraic_geometry.LocallyRingedSpace.to_Γ_Spec_preim_basic_open_eq AlgebraicGeometry.LocallyRingedSpace.toΓSpec_preim_basicOpen_eq theorem toΓSpec_continuous : Continuous X.toΓSpecFun := by rw [isTopologicalBasis_basic_opens.continuous_iff] rintro _ ⟨r, rfl⟩ erw [X.toΓSpec_preim_basicOpen_eq r] exact (X.toRingedSpace.basicOpen r).2 #align algebraic_geometry.LocallyRingedSpace.to_Γ_Spec_continuous AlgebraicGeometry.LocallyRingedSpace.toΓSpec_continuous @[simps] def toΓSpecBase : X.toTopCat ⟶ Spec.topObj (Γ.obj (op X)) where toFun := X.toΓSpecFun continuous_toFun := X.toΓSpec_continuous #align algebraic_geometry.LocallyRingedSpace.to_Γ_Spec_base AlgebraicGeometry.LocallyRingedSpace.toΓSpecBase -- These lemmas have always been bad (#7657), but lean4#2644 made `simp` start noticing attribute [nolint simpNF] AlgebraicGeometry.LocallyRingedSpace.toΓSpecBase_apply variable (r : Γ.obj (op X)) abbrev toΓSpecMapBasicOpen : Opens X := (Opens.map X.toΓSpecBase).obj (basicOpen r) #align algebraic_geometry.LocallyRingedSpace.to_Γ_Spec_map_basic_open AlgebraicGeometry.LocallyRingedSpace.toΓSpecMapBasicOpen theorem toΓSpecMapBasicOpen_eq : X.toΓSpecMapBasicOpen r = X.toRingedSpace.basicOpen r := Opens.ext (X.toΓSpec_preim_basicOpen_eq r) #align algebraic_geometry.LocallyRingedSpace.to_Γ_Spec_map_basic_open_eq AlgebraicGeometry.LocallyRingedSpace.toΓSpecMapBasicOpen_eq abbrev toToΓSpecMapBasicOpen : X.presheaf.obj (op ⊤) ⟶ X.presheaf.obj (op <\| X.toΓSpecMapBasicOpen r) := X.presheaf.map (X.toΓSpecMapBasicOpen r).leTop.op #align algebraic_geometry.LocallyRingedSpace.to_to_Γ_Spec_map_basic_open AlgebraicGeometry.LocallyRingedSpace.toToΓSpecMapBasicOpen theorem isUnit_res_toΓSpecMapBasicOpen : IsUnit (X.toToΓSpecMapBasicOpen r r) := by convert (X.presheaf.map <\| (eqToHom <\| X.toΓSpecMapBasicOpen_eq r).op).isUnit_map (X.toRingedSpace.isUnit_res_basicOpen r) -- Porting note: `rw [comp_apply]` to `erw [comp_apply]` erw [← comp_apply, ← Functor.map_comp] congr #align algebraic_geometry.LocallyRingedSpace.is_unit_res_to_Γ_Spec_map_basic_open AlgebraicGeometry.LocallyRingedSpace.isUnit_res_toΓSpecMapBasicOpen def toΓSpecCApp : (structureSheaf <\| Γ.obj <\| op X).val.obj (op <\| basicOpen r) ⟶ X.presheaf.obj (op <\| X.toΓSpecMapBasicOpen r) := IsLocalization.Away.lift r (isUnit_res_toΓSpecMapBasicOpen _ r) #align algebraic_geometry.LocallyRingedSpace.to_Γ_Spec_c_app AlgebraicGeometry.LocallyRingedSpace.toΓSpecCApp	Mathlib/AlgebraicGeometry/GammaSpecAdjunction.lean	146	160	theorem toΓSpecCApp_iff (f : (structureSheaf <\| Γ.obj <\| op X).val.obj (op <\| basicOpen r) ⟶ X.presheaf.obj (op <\| X.toΓSpecMapBasicOpen r)) : toOpen _ (basicOpen r) ≫ f = X.toToΓSpecMapBasicOpen r ↔ f = X.toΓSpecCApp r := by	-- Porting Note: Type class problem got stuck in `IsLocalization.Away.AwayMap.lift_comp` -- created instance manually. This replaces the `pick_goal` tactics have loc_inst := IsLocalization.to_basicOpen (Γ.obj (op X)) r rw [← @IsLocalization.Away.AwayMap.lift_comp _ _ _ _ _ _ _ r loc_inst _ (X.isUnit_res_toΓSpecMapBasicOpen r)] --pick_goal 5; exact is_localization.to_basic_open _ r constructor · intro h exact IsLocalization.ringHom_ext (Submonoid.powers r) h apply congr_arg
import Mathlib.Data.Set.Lattice import Mathlib.Data.Set.Pairwise.Basic #align_import data.set.pairwise.lattice from "leanprover-community/mathlib"@"c4c2ed622f43768eff32608d4a0f8a6cec1c047d" open Function Set Order variable {α β γ ι ι' : Type} {κ : Sort} {r p q : α → α → Prop} section Pairwise variable {f g : ι → α} {s t u : Set α} {a b : α} namespace Set section CompleteLattice variable [CompleteLattice α] {s : Set ι} {t : Set ι'}	Mathlib/Data/Set/Pairwise/Lattice.lean	72	84	theorem PairwiseDisjoint.biUnion {s : Set ι'} {g : ι' → Set ι} {f : ι → α} (hs : s.PairwiseDisjoint fun i' : ι' => ⨆ i ∈ g i', f i) (hg : ∀ i ∈ s, (g i).PairwiseDisjoint f) : (⋃ i ∈ s, g i).PairwiseDisjoint f := by	rintro a ha b hb hab simp_rw [Set.mem_iUnion] at ha hb obtain ⟨c, hc, ha⟩ := ha obtain ⟨d, hd, hb⟩ := hb obtain hcd \| hcd := eq_or_ne (g c) (g d) · exact hg d hd (hcd.subst ha) hb hab -- Porting note: the elaborator couldn't figure out `f` here. · exact (hs hc hd <\| ne_of_apply_ne _ hcd).mono (le_iSup₂ (f := fun i (_ : i ∈ g c) => f i) a ha) (le_iSup₂ (f := fun i (_ : i ∈ g d) => f i) b hb)
import Mathlib.Data.Finset.Card #align_import data.finset.option from "leanprover-community/mathlib"@"c227d107bbada5d0d9d20287e3282c0a7f1651a0" variable {α β : Type*} open Function namespace Finset def insertNone : Finset α ↪o Finset (Option α) := (OrderEmbedding.ofMapLEIff fun s => cons none (s.map Embedding.some) <\| by simp) fun s t => by rw [le_iff_subset, cons_subset_cons, map_subset_map, le_iff_subset] #align finset.insert_none Finset.insertNone @[simp] theorem mem_insertNone {s : Finset α} : ∀ {o : Option α}, o ∈ insertNone s ↔ ∀ a ∈ o, a ∈ s \| none => iff_of_true (Multiset.mem_cons_self _ _) fun a h => by cases h \| some a => Multiset.mem_cons.trans <\| by simp #align finset.mem_insert_none Finset.mem_insertNone lemma forall_mem_insertNone {s : Finset α} {p : Option α → Prop} : (∀ a ∈ insertNone s, p a) ↔ p none ∧ ∀ a ∈ s, p a := by simp [Option.forall]	Mathlib/Data/Finset/Option.lean	78	78	theorem some_mem_insertNone {s : Finset α} {a : α} : some a ∈ insertNone s ↔ a ∈ s := by	simp
import Mathlib.Analysis.InnerProductSpace.PiL2 import Mathlib.LinearAlgebra.Matrix.Block #align_import analysis.inner_product_space.gram_schmidt_ortho from "leanprover-community/mathlib"@"1a4df69ca1a9a0e5e26bfe12e2b92814216016d0" open Finset Submodule FiniteDimensional variable (𝕜 : Type) {E : Type} [RCLike 𝕜] [NormedAddCommGroup E] [InnerProductSpace 𝕜 E] variable {ι : Type} [LinearOrder ι] [LocallyFiniteOrderBot ι] [IsWellOrder ι (· < ·)] attribute [local instance] IsWellOrder.toHasWellFounded local notation "⟪" x ", " y "⟫" => @inner 𝕜 _ _ x y noncomputable def gramSchmidt [IsWellOrder ι (· < ·)] (f : ι → E) (n : ι) : E := f n - ∑ i : Iio n, orthogonalProjection (𝕜 ∙ gramSchmidt f i) (f n) termination_by n decreasing_by exact mem_Iio.1 i.2 #align gram_schmidt gramSchmidt theorem gramSchmidt_def (f : ι → E) (n : ι) : gramSchmidt 𝕜 f n = f n - ∑ i ∈ Iio n, orthogonalProjection (𝕜 ∙ gramSchmidt 𝕜 f i) (f n) := by rw [← sum_attach, attach_eq_univ, gramSchmidt] #align gram_schmidt_def gramSchmidt_def theorem gramSchmidt_def' (f : ι → E) (n : ι) : f n = gramSchmidt 𝕜 f n + ∑ i ∈ Iio n, orthogonalProjection (𝕜 ∙ gramSchmidt 𝕜 f i) (f n) := by rw [gramSchmidt_def, sub_add_cancel] #align gram_schmidt_def' gramSchmidt_def' theorem gramSchmidt_def'' (f : ι → E) (n : ι) : f n = gramSchmidt 𝕜 f n + ∑ i ∈ Iio n, (⟪gramSchmidt 𝕜 f i, f n⟫ / (‖gramSchmidt 𝕜 f i‖ : 𝕜) ^ 2) • gramSchmidt 𝕜 f i := by convert gramSchmidt_def' 𝕜 f n rw [orthogonalProjection_singleton, RCLike.ofReal_pow] #align gram_schmidt_def'' gramSchmidt_def'' @[simp] theorem gramSchmidt_zero {ι : Type} [LinearOrder ι] [LocallyFiniteOrder ι] [OrderBot ι] [IsWellOrder ι (· < ·)] (f : ι → E) : gramSchmidt 𝕜 f ⊥ = f ⊥ := by rw [gramSchmidt_def, Iio_eq_Ico, Finset.Ico_self, Finset.sum_empty, sub_zero] #align gram_schmidt_zero gramSchmidt_zero theorem gramSchmidt_orthogonal (f : ι → E) {a b : ι} (h₀ : a ≠ b) : ⟪gramSchmidt 𝕜 f a, gramSchmidt 𝕜 f b⟫ = 0 := by suffices ∀ a b : ι, a < b → ⟪gramSchmidt 𝕜 f a, gramSchmidt 𝕜 f b⟫ = 0 by cases' h₀.lt_or_lt with ha hb · exact this _ _ ha · rw [inner_eq_zero_symm] exact this _ _ hb clear h₀ a b intro a b h₀ revert a apply wellFounded_lt.induction b intro b ih a h₀ simp only [gramSchmidt_def 𝕜 f b, inner_sub_right, inner_sum, orthogonalProjection_singleton, inner_smul_right] rw [Finset.sum_eq_single_of_mem a (Finset.mem_Iio.mpr h₀)] · by_cases h : gramSchmidt 𝕜 f a = 0 · simp only [h, inner_zero_left, zero_div, zero_mul, sub_zero] · rw [RCLike.ofReal_pow, ← inner_self_eq_norm_sq_to_K, div_mul_cancel₀, sub_self] rwa [inner_self_ne_zero] intro i hi hia simp only [mul_eq_zero, div_eq_zero_iff, inner_self_eq_zero] right cases' hia.lt_or_lt with hia₁ hia₂ · rw [inner_eq_zero_symm] exact ih a h₀ i hia₁ · exact ih i (mem_Iio.1 hi) a hia₂ #align gram_schmidt_orthogonal gramSchmidt_orthogonal theorem gramSchmidt_pairwise_orthogonal (f : ι → E) : Pairwise fun a b => ⟪gramSchmidt 𝕜 f a, gramSchmidt 𝕜 f b⟫ = 0 := fun _ _ => gramSchmidt_orthogonal 𝕜 f #align gram_schmidt_pairwise_orthogonal gramSchmidt_pairwise_orthogonal theorem gramSchmidt_inv_triangular (v : ι → E) {i j : ι} (hij : i < j) : ⟪gramSchmidt 𝕜 v j, v i⟫ = 0 := by rw [gramSchmidt_def'' 𝕜 v] simp only [inner_add_right, inner_sum, inner_smul_right] set b : ι → E := gramSchmidt 𝕜 v convert zero_add (0 : 𝕜) · exact gramSchmidt_orthogonal 𝕜 v hij.ne' apply Finset.sum_eq_zero rintro k hki' have hki : k < i := by simpa using hki' have : ⟪b j, b k⟫ = 0 := gramSchmidt_orthogonal 𝕜 v (hki.trans hij).ne' simp [this] #align gram_schmidt_inv_triangular gramSchmidt_inv_triangular open Submodule Set Order theorem mem_span_gramSchmidt (f : ι → E) {i j : ι} (hij : i ≤ j) : f i ∈ span 𝕜 (gramSchmidt 𝕜 f '' Set.Iic j) := by rw [gramSchmidt_def' 𝕜 f i] simp_rw [orthogonalProjection_singleton] exact Submodule.add_mem _ (subset_span <\| mem_image_of_mem _ hij) (Submodule.sum_mem _ fun k hk => smul_mem (span 𝕜 (gramSchmidt 𝕜 f '' Set.Iic j)) _ <\| subset_span <\| mem_image_of_mem (gramSchmidt 𝕜 f) <\| (Finset.mem_Iio.1 hk).le.trans hij) #align mem_span_gram_schmidt mem_span_gramSchmidt theorem gramSchmidt_mem_span (f : ι → E) : ∀ {j i}, i ≤ j → gramSchmidt 𝕜 f i ∈ span 𝕜 (f '' Set.Iic j) := by intro j i hij rw [gramSchmidt_def 𝕜 f i] simp_rw [orthogonalProjection_singleton] refine Submodule.sub_mem _ (subset_span (mem_image_of_mem _ hij)) (Submodule.sum_mem _ fun k hk => ?_) let hkj : k < j := (Finset.mem_Iio.1 hk).trans_le hij exact smul_mem _ _ (span_mono (image_subset f <\| Iic_subset_Iic.2 hkj.le) <\| gramSchmidt_mem_span _ le_rfl) termination_by j => j #align gram_schmidt_mem_span gramSchmidt_mem_span theorem span_gramSchmidt_Iic (f : ι → E) (c : ι) : span 𝕜 (gramSchmidt 𝕜 f '' Set.Iic c) = span 𝕜 (f '' Set.Iic c) := span_eq_span (Set.image_subset_iff.2 fun _ => gramSchmidt_mem_span _ _) <\| Set.image_subset_iff.2 fun _ => mem_span_gramSchmidt _ _ #align span_gram_schmidt_Iic span_gramSchmidt_Iic theorem span_gramSchmidt_Iio (f : ι → E) (c : ι) : span 𝕜 (gramSchmidt 𝕜 f '' Set.Iio c) = span 𝕜 (f '' Set.Iio c) := span_eq_span (Set.image_subset_iff.2 fun _ hi => span_mono (image_subset _ <\| Iic_subset_Iio.2 hi) <\| gramSchmidt_mem_span _ _ le_rfl) <\| Set.image_subset_iff.2 fun _ hi => span_mono (image_subset _ <\| Iic_subset_Iio.2 hi) <\| mem_span_gramSchmidt _ _ le_rfl #align span_gram_schmidt_Iio span_gramSchmidt_Iio theorem span_gramSchmidt (f : ι → E) : span 𝕜 (range (gramSchmidt 𝕜 f)) = span 𝕜 (range f) := span_eq_span (range_subset_iff.2 fun _ => span_mono (image_subset_range _ _) <\| gramSchmidt_mem_span _ _ le_rfl) <\| range_subset_iff.2 fun _ => span_mono (image_subset_range _ _) <\| mem_span_gramSchmidt _ _ le_rfl #align span_gram_schmidt span_gramSchmidt theorem gramSchmidt_of_orthogonal {f : ι → E} (hf : Pairwise fun i j => ⟪f i, f j⟫ = 0) : gramSchmidt 𝕜 f = f := by ext i rw [gramSchmidt_def] trans f i - 0 · congr apply Finset.sum_eq_zero intro j hj rw [Submodule.coe_eq_zero] suffices span 𝕜 (f '' Set.Iic j) ⟂ 𝕜 ∙ f i by apply orthogonalProjection_mem_subspace_orthogonalComplement_eq_zero rw [mem_orthogonal_singleton_iff_inner_left] rw [← mem_orthogonal_singleton_iff_inner_right] exact this (gramSchmidt_mem_span 𝕜 f (le_refl j)) rw [isOrtho_span] rintro u ⟨k, hk, rfl⟩ v (rfl : v = f i) apply hf exact (lt_of_le_of_lt hk (Finset.mem_Iio.mp hj)).ne · simp #align gram_schmidt_of_orthogonal gramSchmidt_of_orthogonal variable {𝕜} theorem gramSchmidt_ne_zero_coe {f : ι → E} (n : ι) (h₀ : LinearIndependent 𝕜 (f ∘ ((↑) : Set.Iic n → ι))) : gramSchmidt 𝕜 f n ≠ 0 := by by_contra h have h₁ : f n ∈ span 𝕜 (f '' Set.Iio n) := by rw [← span_gramSchmidt_Iio 𝕜 f n, gramSchmidt_def' 𝕜 f, h, zero_add] apply Submodule.sum_mem _ _ intro a ha simp only [Set.mem_image, Set.mem_Iio, orthogonalProjection_singleton] apply Submodule.smul_mem _ _ _ rw [Finset.mem_Iio] at ha exact subset_span ⟨a, ha, by rfl⟩ have h₂ : (f ∘ ((↑) : Set.Iic n → ι)) ⟨n, le_refl n⟩ ∈ span 𝕜 (f ∘ ((↑) : Set.Iic n → ι) '' Set.Iio ⟨n, le_refl n⟩) := by rw [image_comp] simpa using h₁ apply LinearIndependent.not_mem_span_image h₀ _ h₂ simp only [Set.mem_Iio, lt_self_iff_false, not_false_iff] #align gram_schmidt_ne_zero_coe gramSchmidt_ne_zero_coe theorem gramSchmidt_ne_zero {f : ι → E} (n : ι) (h₀ : LinearIndependent 𝕜 f) : gramSchmidt 𝕜 f n ≠ 0 := gramSchmidt_ne_zero_coe _ (LinearIndependent.comp h₀ _ Subtype.coe_injective) #align gram_schmidt_ne_zero gramSchmidt_ne_zero theorem gramSchmidt_triangular {i j : ι} (hij : i < j) (b : Basis ι 𝕜 E) : b.repr (gramSchmidt 𝕜 b i) j = 0 := by have : gramSchmidt 𝕜 b i ∈ span 𝕜 (gramSchmidt 𝕜 b '' Set.Iio j) := subset_span ((Set.mem_image _ _ _).2 ⟨i, hij, rfl⟩) have : gramSchmidt 𝕜 b i ∈ span 𝕜 (b '' Set.Iio j) := by rwa [← span_gramSchmidt_Iio 𝕜 b j] have : ↑(b.repr (gramSchmidt 𝕜 b i)).support ⊆ Set.Iio j := Basis.repr_support_subset_of_mem_span b (Set.Iio j) this exact (Finsupp.mem_supported' _ _).1 ((Finsupp.mem_supported 𝕜 _).2 this) j Set.not_mem_Iio_self #align gram_schmidt_triangular gramSchmidt_triangular theorem gramSchmidt_linearIndependent {f : ι → E} (h₀ : LinearIndependent 𝕜 f) : LinearIndependent 𝕜 (gramSchmidt 𝕜 f) := linearIndependent_of_ne_zero_of_inner_eq_zero (fun _ => gramSchmidt_ne_zero _ h₀) fun _ _ => gramSchmidt_orthogonal 𝕜 f #align gram_schmidt_linear_independent gramSchmidt_linearIndependent noncomputable def gramSchmidtBasis (b : Basis ι 𝕜 E) : Basis ι 𝕜 E := Basis.mk (gramSchmidt_linearIndependent b.linearIndependent) ((span_gramSchmidt 𝕜 b).trans b.span_eq).ge #align gram_schmidt_basis gramSchmidtBasis theorem coe_gramSchmidtBasis (b : Basis ι 𝕜 E) : (gramSchmidtBasis b : ι → E) = gramSchmidt 𝕜 b := Basis.coe_mk _ _ #align coe_gram_schmidt_basis coe_gramSchmidtBasis variable (𝕜) noncomputable def gramSchmidtNormed (f : ι → E) (n : ι) : E := (‖gramSchmidt 𝕜 f n‖ : 𝕜)⁻¹ • gramSchmidt 𝕜 f n #align gram_schmidt_normed gramSchmidtNormed variable {𝕜} theorem gramSchmidtNormed_unit_length_coe {f : ι → E} (n : ι) (h₀ : LinearIndependent 𝕜 (f ∘ ((↑) : Set.Iic n → ι))) : ‖gramSchmidtNormed 𝕜 f n‖ = 1 := by simp only [gramSchmidt_ne_zero_coe n h₀, gramSchmidtNormed, norm_smul_inv_norm, Ne, not_false_iff] #align gram_schmidt_normed_unit_length_coe gramSchmidtNormed_unit_length_coe theorem gramSchmidtNormed_unit_length {f : ι → E} (n : ι) (h₀ : LinearIndependent 𝕜 f) : ‖gramSchmidtNormed 𝕜 f n‖ = 1 := gramSchmidtNormed_unit_length_coe _ (LinearIndependent.comp h₀ _ Subtype.coe_injective) #align gram_schmidt_normed_unit_length gramSchmidtNormed_unit_length theorem gramSchmidtNormed_unit_length' {f : ι → E} {n : ι} (hn : gramSchmidtNormed 𝕜 f n ≠ 0) : ‖gramSchmidtNormed 𝕜 f n‖ = 1 := by rw [gramSchmidtNormed] at * rw [norm_smul_inv_norm] simpa using hn #align gram_schmidt_normed_unit_length' gramSchmidtNormed_unit_length' theorem gramSchmidt_orthonormal {f : ι → E} (h₀ : LinearIndependent 𝕜 f) : Orthonormal 𝕜 (gramSchmidtNormed 𝕜 f) := by unfold Orthonormal constructor · simp only [gramSchmidtNormed_unit_length, h₀, eq_self_iff_true, imp_true_iff] · intro i j hij simp only [gramSchmidtNormed, inner_smul_left, inner_smul_right, RCLike.conj_inv, RCLike.conj_ofReal, mul_eq_zero, inv_eq_zero, RCLike.ofReal_eq_zero, norm_eq_zero] repeat' right exact gramSchmidt_orthogonal 𝕜 f hij #align gram_schmidt_orthonormal gramSchmidt_orthonormal theorem gramSchmidt_orthonormal' (f : ι → E) : Orthonormal 𝕜 fun i : { i \| gramSchmidtNormed 𝕜 f i ≠ 0 } => gramSchmidtNormed 𝕜 f i := by refine ⟨fun i => gramSchmidtNormed_unit_length' i.prop, ?_⟩ rintro i j (hij : ¬_) rw [Subtype.ext_iff] at hij simp [gramSchmidtNormed, inner_smul_left, inner_smul_right, gramSchmidt_orthogonal 𝕜 f hij] #align gram_schmidt_orthonormal' gramSchmidt_orthonormal' theorem span_gramSchmidtNormed (f : ι → E) (s : Set ι) : span 𝕜 (gramSchmidtNormed 𝕜 f '' s) = span 𝕜 (gramSchmidt 𝕜 f '' s) := by refine span_eq_span (Set.image_subset_iff.2 fun i hi => smul_mem _ _ <\| subset_span <\| mem_image_of_mem _ hi) (Set.image_subset_iff.2 fun i hi => span_mono (image_subset _ <\| singleton_subset_set_iff.2 hi) ?_) simp only [coe_singleton, Set.image_singleton] by_cases h : gramSchmidt 𝕜 f i = 0 · simp [h] · refine mem_span_singleton.2 ⟨‖gramSchmidt 𝕜 f i‖, smul_inv_smul₀ ?_ _⟩ exact mod_cast norm_ne_zero_iff.2 h #align span_gram_schmidt_normed span_gramSchmidtNormed theorem span_gramSchmidtNormed_range (f : ι → E) : span 𝕜 (range (gramSchmidtNormed 𝕜 f)) = span 𝕜 (range (gramSchmidt 𝕜 f)) := by simpa only [image_univ.symm] using span_gramSchmidtNormed f univ #align span_gram_schmidt_normed_range span_gramSchmidtNormed_range section OrthonormalBasis variable [Fintype ι] [FiniteDimensional 𝕜 E] (h : finrank 𝕜 E = Fintype.card ι) (f : ι → E) noncomputable def gramSchmidtOrthonormalBasis : OrthonormalBasis ι 𝕜 E := ((gramSchmidt_orthonormal' f).exists_orthonormalBasis_extension_of_card_eq (v := gramSchmidtNormed 𝕜 f) h).choose #align gram_schmidt_orthonormal_basis gramSchmidtOrthonormalBasis theorem gramSchmidtOrthonormalBasis_apply {f : ι → E} {i : ι} (hi : gramSchmidtNormed 𝕜 f i ≠ 0) : gramSchmidtOrthonormalBasis h f i = gramSchmidtNormed 𝕜 f i := ((gramSchmidt_orthonormal' f).exists_orthonormalBasis_extension_of_card_eq (v := gramSchmidtNormed 𝕜 f) h).choose_spec i hi #align gram_schmidt_orthonormal_basis_apply gramSchmidtOrthonormalBasis_apply	Mathlib/Analysis/InnerProductSpace/GramSchmidtOrtho.lean	345	351	theorem gramSchmidtOrthonormalBasis_apply_of_orthogonal {f : ι → E} (hf : Pairwise fun i j => ⟪f i, f j⟫ = 0) {i : ι} (hi : f i ≠ 0) : gramSchmidtOrthonormalBasis h f i = (‖f i‖⁻¹ : 𝕜) • f i := by	have H : gramSchmidtNormed 𝕜 f i = (‖f i‖⁻¹ : 𝕜) • f i := by rw [gramSchmidtNormed, gramSchmidt_of_orthogonal 𝕜 hf] rw [gramSchmidtOrthonormalBasis_apply h, H] simpa [H] using hi
import Mathlib.Topology.Algebra.UniformConvergence #align_import topology.algebra.module.strong_topology from "leanprover-community/mathlib"@"8905e5ed90859939681a725b00f6063e65096d95" open scoped Topology UniformConvergence section General variable {𝕜₁ 𝕜₂ : Type} [NormedField 𝕜₁] [NormedField 𝕜₂] (σ : 𝕜₁ →+ 𝕜₂) {E E' F F' : Type} [AddCommGroup E] [Module 𝕜₁ E] [AddCommGroup E'] [Module ℝ E'] [AddCommGroup F] [Module 𝕜₂ F] [AddCommGroup F'] [Module ℝ F'] [TopologicalSpace E] [TopologicalSpace E'] (F) @[nolint unusedArguments] def UniformConvergenceCLM [TopologicalSpace F] [TopologicalAddGroup F] (_ : Set (Set E)) := E →SL[σ] F namespace UniformConvergenceCLM instance instFunLike [TopologicalSpace F] [TopologicalAddGroup F] (𝔖 : Set (Set E)) : FunLike (UniformConvergenceCLM σ F 𝔖) E F := ContinuousLinearMap.funLike instance instContinuousSemilinearMapClass [TopologicalSpace F] [TopologicalAddGroup F] (𝔖 : Set (Set E)) : ContinuousSemilinearMapClass (UniformConvergenceCLM σ F 𝔖) σ E F := ContinuousLinearMap.continuousSemilinearMapClass instance instTopologicalSpace [TopologicalSpace F] [TopologicalAddGroup F] (𝔖 : Set (Set E)) : TopologicalSpace (UniformConvergenceCLM σ F 𝔖) := (@UniformOnFun.topologicalSpace E F (TopologicalAddGroup.toUniformSpace F) 𝔖).induced (DFunLike.coe : (UniformConvergenceCLM σ F 𝔖) → (E →ᵤ[𝔖] F)) #align continuous_linear_map.strong_topology UniformConvergenceCLM.instTopologicalSpace theorem topologicalSpace_eq [UniformSpace F] [UniformAddGroup F] (𝔖 : Set (Set E)) : instTopologicalSpace σ F 𝔖 = TopologicalSpace.induced DFunLike.coe (UniformOnFun.topologicalSpace E F 𝔖) := by rw [instTopologicalSpace] congr exact UniformAddGroup.toUniformSpace_eq instance instUniformSpace [UniformSpace F] [UniformAddGroup F] (𝔖 : Set (Set E)) : UniformSpace (UniformConvergenceCLM σ F 𝔖) := UniformSpace.replaceTopology ((UniformOnFun.uniformSpace E F 𝔖).comap (DFunLike.coe : (UniformConvergenceCLM σ F 𝔖) → (E →ᵤ[𝔖] F))) (by rw [UniformConvergenceCLM.instTopologicalSpace, UniformAddGroup.toUniformSpace_eq]; rfl) #align continuous_linear_map.strong_uniformity UniformConvergenceCLM.instUniformSpace theorem uniformSpace_eq [UniformSpace F] [UniformAddGroup F] (𝔖 : Set (Set E)) : instUniformSpace σ F 𝔖 = UniformSpace.comap DFunLike.coe (UniformOnFun.uniformSpace E F 𝔖) := by rw [instUniformSpace, UniformSpace.replaceTopology_eq] @[simp] theorem uniformity_toTopologicalSpace_eq [UniformSpace F] [UniformAddGroup F] (𝔖 : Set (Set E)) : (UniformConvergenceCLM.instUniformSpace σ F 𝔖).toTopologicalSpace = UniformConvergenceCLM.instTopologicalSpace σ F 𝔖 := rfl #align continuous_linear_map.strong_uniformity_topology_eq UniformConvergenceCLM.uniformity_toTopologicalSpace_eq theorem uniformEmbedding_coeFn [UniformSpace F] [UniformAddGroup F] (𝔖 : Set (Set E)) : UniformEmbedding (α := UniformConvergenceCLM σ F 𝔖) (β := E →ᵤ[𝔖] F) DFunLike.coe := ⟨⟨rfl⟩, DFunLike.coe_injective⟩ #align continuous_linear_map.strong_uniformity.uniform_embedding_coe_fn UniformConvergenceCLM.uniformEmbedding_coeFn theorem embedding_coeFn [UniformSpace F] [UniformAddGroup F] (𝔖 : Set (Set E)) : Embedding (X := UniformConvergenceCLM σ F 𝔖) (Y := E →ᵤ[𝔖] F) (UniformOnFun.ofFun 𝔖 ∘ DFunLike.coe) := UniformEmbedding.embedding (uniformEmbedding_coeFn _ _ _) #align continuous_linear_map.strong_topology.embedding_coe_fn UniformConvergenceCLM.embedding_coeFn instance instAddCommGroup [TopologicalSpace F] [TopologicalAddGroup F] (𝔖 : Set (Set E)) : AddCommGroup (UniformConvergenceCLM σ F 𝔖) := ContinuousLinearMap.addCommGroup instance instUniformAddGroup [UniformSpace F] [UniformAddGroup F] (𝔖 : Set (Set E)) : UniformAddGroup (UniformConvergenceCLM σ F 𝔖) := by let φ : (UniformConvergenceCLM σ F 𝔖) →+ E →ᵤ[𝔖] F := ⟨⟨(DFunLike.coe : (UniformConvergenceCLM σ F 𝔖) → E →ᵤ[𝔖] F), rfl⟩, fun _ _ => rfl⟩ exact (uniformEmbedding_coeFn _ _ _).uniformAddGroup φ #align continuous_linear_map.strong_uniformity.uniform_add_group UniformConvergenceCLM.instUniformAddGroup instance instTopologicalAddGroup [TopologicalSpace F] [TopologicalAddGroup F] (𝔖 : Set (Set E)) : TopologicalAddGroup (UniformConvergenceCLM σ F 𝔖) := by letI : UniformSpace F := TopologicalAddGroup.toUniformSpace F haveI : UniformAddGroup F := comm_topologicalAddGroup_is_uniform infer_instance #align continuous_linear_map.strong_topology.topological_add_group UniformConvergenceCLM.instTopologicalAddGroup theorem t2Space [TopologicalSpace F] [TopologicalAddGroup F] [T2Space F] (𝔖 : Set (Set E)) (h𝔖 : ⋃₀ 𝔖 = Set.univ) : T2Space (UniformConvergenceCLM σ F 𝔖) := by letI : UniformSpace F := TopologicalAddGroup.toUniformSpace F haveI : UniformAddGroup F := comm_topologicalAddGroup_is_uniform haveI : T2Space (E →ᵤ[𝔖] F) := UniformOnFun.t2Space_of_covering h𝔖 exact (embedding_coeFn σ F 𝔖).t2Space #align continuous_linear_map.strong_topology.t2_space UniformConvergenceCLM.t2Space instance instDistribMulAction (M : Type) [Monoid M] [DistribMulAction M F] [SMulCommClass 𝕜₂ M F] [TopologicalSpace F] [TopologicalAddGroup F] [ContinuousConstSMul M F] (𝔖 : Set (Set E)) : DistribMulAction M (UniformConvergenceCLM σ F 𝔖) := ContinuousLinearMap.distribMulAction instance instModule (R : Type) [Semiring R] [Module R F] [SMulCommClass 𝕜₂ R F] [TopologicalSpace F] [ContinuousConstSMul R F] [TopologicalAddGroup F] (𝔖 : Set (Set E)) : Module R (UniformConvergenceCLM σ F 𝔖) := ContinuousLinearMap.module theorem continuousSMul [RingHomSurjective σ] [RingHomIsometric σ] [TopologicalSpace F] [TopologicalAddGroup F] [ContinuousSMul 𝕜₂ F] (𝔖 : Set (Set E)) (h𝔖₃ : ∀ S ∈ 𝔖, Bornology.IsVonNBounded 𝕜₁ S) : ContinuousSMul 𝕜₂ (UniformConvergenceCLM σ F 𝔖) := by letI : UniformSpace F := TopologicalAddGroup.toUniformSpace F haveI : UniformAddGroup F := comm_topologicalAddGroup_is_uniform let φ : (UniformConvergenceCLM σ F 𝔖) →ₗ[𝕜₂] E → F := ⟨⟨DFunLike.coe, fun _ _ => rfl⟩, fun _ _ => rfl⟩ exact UniformOnFun.continuousSMul_induced_of_image_bounded 𝕜₂ E F (UniformConvergenceCLM σ F 𝔖) φ ⟨rfl⟩ fun u s hs => (h𝔖₃ s hs).image u #align continuous_linear_map.strong_topology.has_continuous_smul UniformConvergenceCLM.continuousSMul theorem hasBasis_nhds_zero_of_basis [TopologicalSpace F] [TopologicalAddGroup F] {ι : Type} (𝔖 : Set (Set E)) (h𝔖₁ : 𝔖.Nonempty) (h𝔖₂ : DirectedOn (· ⊆ ·) 𝔖) {p : ι → Prop} {b : ι → Set F} (h : (𝓝 0 : Filter F).HasBasis p b) : (𝓝 (0 : UniformConvergenceCLM σ F 𝔖)).HasBasis (fun Si : Set E × ι => Si.1 ∈ 𝔖 ∧ p Si.2) fun Si => { f : E →SL[σ] F \| ∀ x ∈ Si.1, f x ∈ b Si.2 } := by letI : UniformSpace F := TopologicalAddGroup.toUniformSpace F haveI : UniformAddGroup F := comm_topologicalAddGroup_is_uniform rw [(embedding_coeFn σ F 𝔖).toInducing.nhds_eq_comap] exact (UniformOnFun.hasBasis_nhds_zero_of_basis 𝔖 h𝔖₁ h𝔖₂ h).comap DFunLike.coe #align continuous_linear_map.strong_topology.has_basis_nhds_zero_of_basis UniformConvergenceCLM.hasBasis_nhds_zero_of_basis theorem hasBasis_nhds_zero [TopologicalSpace F] [TopologicalAddGroup F] (𝔖 : Set (Set E)) (h𝔖₁ : 𝔖.Nonempty) (h𝔖₂ : DirectedOn (· ⊆ ·) 𝔖) : (𝓝 (0 : UniformConvergenceCLM σ F 𝔖)).HasBasis (fun SV : Set E × Set F => SV.1 ∈ 𝔖 ∧ SV.2 ∈ (𝓝 0 : Filter F)) fun SV => { f : UniformConvergenceCLM σ F 𝔖 \| ∀ x ∈ SV.1, f x ∈ SV.2 } := hasBasis_nhds_zero_of_basis σ F 𝔖 h𝔖₁ h𝔖₂ (𝓝 0).basis_sets #align continuous_linear_map.strong_topology.has_basis_nhds_zero UniformConvergenceCLM.hasBasis_nhds_zero instance instUniformContinuousConstSMul (M : Type) [Monoid M] [DistribMulAction M F] [SMulCommClass 𝕜₂ M F] [UniformSpace F] [UniformAddGroup F] [UniformContinuousConstSMul M F] (𝔖 : Set (Set E)) : UniformContinuousConstSMul M (UniformConvergenceCLM σ F 𝔖) := (uniformEmbedding_coeFn σ F 𝔖).toUniformInducing.uniformContinuousConstSMul fun _ _ ↦ by rfl instance instContinuousConstSMul (M : Type) [Monoid M] [DistribMulAction M F] [SMulCommClass 𝕜₂ M F] [TopologicalSpace F] [TopologicalAddGroup F] [ContinuousConstSMul M F] (𝔖 : Set (Set E)) : ContinuousConstSMul M (UniformConvergenceCLM σ F 𝔖) := let _ := TopologicalAddGroup.toUniformSpace F have _ : UniformAddGroup F := comm_topologicalAddGroup_is_uniform have _ := uniformContinuousConstSMul_of_continuousConstSMul M F inferInstance theorem tendsto_iff_tendstoUniformlyOn {ι : Type*} {p : Filter ι} [UniformSpace F] [UniformAddGroup F] (𝔖 : Set (Set E)) {a : ι → UniformConvergenceCLM σ F 𝔖} {a₀ : UniformConvergenceCLM σ F 𝔖} : Filter.Tendsto a p (𝓝 a₀) ↔ ∀ s ∈ 𝔖, TendstoUniformlyOn (a · ·) a₀ p s := by rw [(embedding_coeFn σ F 𝔖).tendsto_nhds_iff, UniformOnFun.tendsto_iff_tendstoUniformlyOn] rfl variable {𝔖₁ 𝔖₂ : Set (Set E)}	Mathlib/Topology/Algebra/Module/StrongTopology.lean	224	227	theorem uniformSpace_mono [UniformSpace F] [UniformAddGroup F] (h : 𝔖₂ ⊆ 𝔖₁) : instUniformSpace σ F 𝔖₁ ≤ instUniformSpace σ F 𝔖₂ := by	simp_rw [uniformSpace_eq] exact UniformSpace.comap_mono (UniformOnFun.mono (le_refl _) h)
import Mathlib.Topology.Bases import Mathlib.Order.Filter.CountableInter import Mathlib.Topology.Compactness.SigmaCompact open Set Filter Topology TopologicalSpace universe u v variable {X : Type u} {Y : Type v} {ι : Type} variable [TopologicalSpace X] [TopologicalSpace Y] {s t : Set X} section Lindelof def IsLindelof (s : Set X) := ∀ ⦃f⦄ [NeBot f] [CountableInterFilter f], f ≤ 𝓟 s → ∃ x ∈ s, ClusterPt x f theorem IsLindelof.compl_mem_sets (hs : IsLindelof s) {f : Filter X} [CountableInterFilter f] (hf : ∀ x ∈ s, sᶜ ∈ 𝓝 x ⊓ f) : sᶜ ∈ f := by contrapose! hf simp only [not_mem_iff_inf_principal_compl, compl_compl, inf_assoc] at hf ⊢ exact hs inf_le_right theorem IsLindelof.compl_mem_sets_of_nhdsWithin (hs : IsLindelof s) {f : Filter X} [CountableInterFilter f] (hf : ∀ x ∈ s, ∃ t ∈ 𝓝[s] x, tᶜ ∈ f) : sᶜ ∈ f := by refine hs.compl_mem_sets fun x hx ↦ ?_ rw [← disjoint_principal_right, disjoint_right_comm, (basis_sets _).disjoint_iff_left] exact hf x hx @[elab_as_elim] theorem IsLindelof.induction_on (hs : IsLindelof s) {p : Set X → Prop} (hmono : ∀ ⦃s t⦄, s ⊆ t → p t → p s) (hcountable_union : ∀ (S : Set (Set X)), S.Countable → (∀ s ∈ S, p s) → p (⋃₀ S)) (hnhds : ∀ x ∈ s, ∃ t ∈ 𝓝[s] x, p t) : p s := by let f : Filter X := ofCountableUnion p hcountable_union (fun t ht _ hsub ↦ hmono hsub ht) have : sᶜ ∈ f := hs.compl_mem_sets_of_nhdsWithin (by simpa [f] using hnhds) rwa [← compl_compl s] theorem IsLindelof.inter_right (hs : IsLindelof s) (ht : IsClosed t) : IsLindelof (s ∩ t) := by intro f hnf _ hstf rw [← inf_principal, le_inf_iff] at hstf obtain ⟨x, hsx, hx⟩ : ∃ x ∈ s, ClusterPt x f := hs hstf.1 have hxt : x ∈ t := ht.mem_of_nhdsWithin_neBot <\| hx.mono hstf.2 exact ⟨x, ⟨hsx, hxt⟩, hx⟩ theorem IsLindelof.inter_left (ht : IsLindelof t) (hs : IsClosed s) : IsLindelof (s ∩ t) := inter_comm t s ▸ ht.inter_right hs theorem IsLindelof.diff (hs : IsLindelof s) (ht : IsOpen t) : IsLindelof (s \ t) := hs.inter_right (isClosed_compl_iff.mpr ht) theorem IsLindelof.of_isClosed_subset (hs : IsLindelof s) (ht : IsClosed t) (h : t ⊆ s) : IsLindelof t := inter_eq_self_of_subset_right h ▸ hs.inter_right ht theorem IsLindelof.image_of_continuousOn {f : X → Y} (hs : IsLindelof s) (hf : ContinuousOn f s) : IsLindelof (f '' s) := by intro l lne _ ls have : NeBot (l.comap f ⊓ 𝓟 s) := comap_inf_principal_neBot_of_image_mem lne (le_principal_iff.1 ls) obtain ⟨x, hxs, hx⟩ : ∃ x ∈ s, ClusterPt x (l.comap f ⊓ 𝓟 s) := @hs _ this _ inf_le_right haveI := hx.neBot use f x, mem_image_of_mem f hxs have : Tendsto f (𝓝 x ⊓ (comap f l ⊓ 𝓟 s)) (𝓝 (f x) ⊓ l) := by convert (hf x hxs).inf (@tendsto_comap _ _ f l) using 1 rw [nhdsWithin] ac_rfl exact this.neBot theorem IsLindelof.image {f : X → Y} (hs : IsLindelof s) (hf : Continuous f) : IsLindelof (f '' s) := hs.image_of_continuousOn hf.continuousOn theorem IsLindelof.adherence_nhdset {f : Filter X} [CountableInterFilter f] (hs : IsLindelof s) (hf₂ : f ≤ 𝓟 s) (ht₁ : IsOpen t) (ht₂ : ∀ x ∈ s, ClusterPt x f → x ∈ t) : t ∈ f := (eq_or_neBot _).casesOn mem_of_eq_bot fun _ ↦ let ⟨x, hx, hfx⟩ := @hs (f ⊓ 𝓟 tᶜ) _ _ <\| inf_le_of_left_le hf₂ have : x ∈ t := ht₂ x hx hfx.of_inf_left have : tᶜ ∩ t ∈ 𝓝[tᶜ] x := inter_mem_nhdsWithin _ (ht₁.mem_nhds this) have A : 𝓝[tᶜ] x = ⊥ := empty_mem_iff_bot.1 <\| compl_inter_self t ▸ this have : 𝓝[tᶜ] x ≠ ⊥ := hfx.of_inf_right.ne absurd A this theorem IsLindelof.elim_countable_subcover {ι : Type v} (hs : IsLindelof s) (U : ι → Set X) (hUo : ∀ i, IsOpen (U i)) (hsU : s ⊆ ⋃ i, U i) : ∃ r : Set ι, r.Countable ∧ (s ⊆ ⋃ i ∈ r, U i) := by have hmono : ∀ ⦃s t : Set X⦄, s ⊆ t → (∃ r : Set ι, r.Countable ∧ t ⊆ ⋃ i ∈ r, U i) → (∃ r : Set ι, r.Countable ∧ s ⊆ ⋃ i ∈ r, U i) := by intro _ _ hst ⟨r, ⟨hrcountable, hsub⟩⟩ exact ⟨r, hrcountable, Subset.trans hst hsub⟩ have hcountable_union : ∀ (S : Set (Set X)), S.Countable → (∀ s ∈ S, ∃ r : Set ι, r.Countable ∧ (s ⊆ ⋃ i ∈ r, U i)) → ∃ r : Set ι, r.Countable ∧ (⋃₀ S ⊆ ⋃ i ∈ r, U i) := by intro S hS hsr choose! r hr using hsr refine ⟨⋃ s ∈ S, r s, hS.biUnion_iff.mpr (fun s hs ↦ (hr s hs).1), ?_⟩ refine sUnion_subset ?h.right.h simp only [mem_iUnion, exists_prop, iUnion_exists, biUnion_and'] exact fun i is x hx ↦ mem_biUnion is ((hr i is).2 hx) have h_nhds : ∀ x ∈ s, ∃ t ∈ 𝓝[s] x, ∃ r : Set ι, r.Countable ∧ (t ⊆ ⋃ i ∈ r, U i) := by intro x hx let ⟨i, hi⟩ := mem_iUnion.1 (hsU hx) refine ⟨U i, mem_nhdsWithin_of_mem_nhds ((hUo i).mem_nhds hi), {i}, by simp, ?_⟩ simp only [mem_singleton_iff, iUnion_iUnion_eq_left] exact Subset.refl _ exact hs.induction_on hmono hcountable_union h_nhds theorem IsLindelof.elim_nhds_subcover' (hs : IsLindelof s) (U : ∀ x ∈ s, Set X) (hU : ∀ x (hx : x ∈ s), U x ‹x ∈ s› ∈ 𝓝 x) : ∃ t : Set s, t.Countable ∧ s ⊆ ⋃ x ∈ t, U (x : s) x.2 := by have := hs.elim_countable_subcover (fun x : s ↦ interior (U x x.2)) (fun _ ↦ isOpen_interior) fun x hx ↦ mem_iUnion.2 ⟨⟨x, hx⟩, mem_interior_iff_mem_nhds.2 <\| hU _ _⟩ rcases this with ⟨r, ⟨hr, hs⟩⟩ use r, hr apply Subset.trans hs apply iUnion₂_subset intro i hi apply Subset.trans interior_subset exact subset_iUnion_of_subset i (subset_iUnion_of_subset hi (Subset.refl _)) theorem IsLindelof.elim_nhds_subcover (hs : IsLindelof s) (U : X → Set X) (hU : ∀ x ∈ s, U x ∈ 𝓝 x) : ∃ t : Set X, t.Countable ∧ (∀ x ∈ t, x ∈ s) ∧ s ⊆ ⋃ x ∈ t, U x := by let ⟨t, ⟨htc, htsub⟩⟩ := hs.elim_nhds_subcover' (fun x _ ↦ U x) hU refine ⟨↑t, Countable.image htc Subtype.val, ?_⟩ constructor · intro _ simp only [mem_image, Subtype.exists, exists_and_right, exists_eq_right, forall_exists_index] tauto · have : ⋃ x ∈ t, U ↑x = ⋃ x ∈ Subtype.val '' t, U x := biUnion_image.symm rwa [← this] theorem IsLindelof.disjoint_nhdsSet_left {l : Filter X} [CountableInterFilter l] (hs : IsLindelof s) : Disjoint (𝓝ˢ s) l ↔ ∀ x ∈ s, Disjoint (𝓝 x) l := by refine ⟨fun h x hx ↦ h.mono_left <\| nhds_le_nhdsSet hx, fun H ↦ ?_⟩ choose! U hxU hUl using fun x hx ↦ (nhds_basis_opens x).disjoint_iff_left.1 (H x hx) choose hxU hUo using hxU rcases hs.elim_nhds_subcover U fun x hx ↦ (hUo x hx).mem_nhds (hxU x hx) with ⟨t, htc, hts, hst⟩ refine (hasBasis_nhdsSet _).disjoint_iff_left.2 ⟨⋃ x ∈ t, U x, ⟨isOpen_biUnion fun x hx ↦ hUo x (hts x hx), hst⟩, ?_⟩ rw [compl_iUnion₂] exact (countable_bInter_mem htc).mpr (fun i hi ↦ hUl _ (hts _ hi)) theorem IsLindelof.disjoint_nhdsSet_right {l : Filter X} [CountableInterFilter l] (hs : IsLindelof s) : Disjoint l (𝓝ˢ s) ↔ ∀ x ∈ s, Disjoint l (𝓝 x) := by simpa only [disjoint_comm] using hs.disjoint_nhdsSet_left theorem IsLindelof.elim_countable_subfamily_closed {ι : Type v} (hs : IsLindelof s) (t : ι → Set X) (htc : ∀ i, IsClosed (t i)) (hst : (s ∩ ⋂ i, t i) = ∅) : ∃ u : Set ι, u.Countable ∧ (s ∩ ⋂ i ∈ u, t i) = ∅ := by let U := tᶜ have hUo : ∀ i, IsOpen (U i) := by simp only [U, Pi.compl_apply, isOpen_compl_iff]; exact htc have hsU : s ⊆ ⋃ i, U i := by simp only [U, Pi.compl_apply] rw [← compl_iInter] apply disjoint_compl_left_iff_subset.mp simp only [compl_iInter, compl_iUnion, compl_compl] apply Disjoint.symm exact disjoint_iff_inter_eq_empty.mpr hst rcases hs.elim_countable_subcover U hUo hsU with ⟨u, ⟨hucount, husub⟩⟩ use u, hucount rw [← disjoint_compl_left_iff_subset] at husub simp only [U, Pi.compl_apply, compl_iUnion, compl_compl] at husub exact disjoint_iff_inter_eq_empty.mp (Disjoint.symm husub) theorem IsLindelof.inter_iInter_nonempty {ι : Type v} (hs : IsLindelof s) (t : ι → Set X) (htc : ∀ i, IsClosed (t i)) (hst : ∀ u : Set ι, u.Countable ∧ (s ∩ ⋂ i ∈ u, t i).Nonempty) : (s ∩ ⋂ i, t i).Nonempty := by contrapose! hst rcases hs.elim_countable_subfamily_closed t htc hst with ⟨u, ⟨_, husub⟩⟩ exact ⟨u, fun _ ↦ husub⟩ theorem IsLindelof.elim_countable_subcover_image {b : Set ι} {c : ι → Set X} (hs : IsLindelof s) (hc₁ : ∀ i ∈ b, IsOpen (c i)) (hc₂ : s ⊆ ⋃ i ∈ b, c i) : ∃ b', b' ⊆ b ∧ Set.Countable b' ∧ s ⊆ ⋃ i ∈ b', c i := by simp only [Subtype.forall', biUnion_eq_iUnion] at hc₁ hc₂ rcases hs.elim_countable_subcover (fun i ↦ c i : b → Set X) hc₁ hc₂ with ⟨d, hd⟩ refine ⟨Subtype.val '' d, by simp, Countable.image hd.1 Subtype.val, ?_⟩ rw [biUnion_image] exact hd.2 theorem isLindelof_of_countable_subcover (h : ∀ {ι : Type u} (U : ι → Set X), (∀ i, IsOpen (U i)) → (s ⊆ ⋃ i, U i) → ∃ t : Set ι, t.Countable ∧ s ⊆ ⋃ i ∈ t, U i) : IsLindelof s := fun f hf hfs ↦ by contrapose! h simp only [ClusterPt, not_neBot, ← disjoint_iff, SetCoe.forall', (nhds_basis_opens _).disjoint_iff_left] at h choose fsub U hU hUf using h refine ⟨s, U, fun x ↦ (hU x).2, fun x hx ↦ mem_iUnion.2 ⟨⟨x, hx⟩, (hU _).1 ⟩, ?_⟩ intro t ht h have uinf := f.sets_of_superset (le_principal_iff.1 fsub) h have uninf : ⋂ i ∈ t, (U i)ᶜ ∈ f := (countable_bInter_mem ht).mpr (fun _ _ ↦ hUf _) rw [← compl_iUnion₂] at uninf have uninf := compl_not_mem uninf simp only [compl_compl] at uninf contradiction theorem isLindelof_of_countable_subfamily_closed (h : ∀ {ι : Type u} (t : ι → Set X), (∀ i, IsClosed (t i)) → (s ∩ ⋂ i, t i) = ∅ → ∃ u : Set ι, u.Countable ∧ (s ∩ ⋂ i ∈ u, t i) = ∅) : IsLindelof s := isLindelof_of_countable_subcover fun U hUo hsU ↦ by rw [← disjoint_compl_right_iff_subset, compl_iUnion, disjoint_iff] at hsU rcases h (fun i ↦ (U i)ᶜ) (fun i ↦ (hUo _).isClosed_compl) hsU with ⟨t, ht⟩ refine ⟨t, ?_⟩ rwa [← disjoint_compl_right_iff_subset, compl_iUnion₂, disjoint_iff] theorem isLindelof_iff_countable_subcover : IsLindelof s ↔ ∀ {ι : Type u} (U : ι → Set X), (∀ i, IsOpen (U i)) → (s ⊆ ⋃ i, U i) → ∃ t : Set ι, t.Countable ∧ s ⊆ ⋃ i ∈ t, U i := ⟨fun hs ↦ hs.elim_countable_subcover, isLindelof_of_countable_subcover⟩ theorem isLindelof_iff_countable_subfamily_closed : IsLindelof s ↔ ∀ {ι : Type u} (t : ι → Set X), (∀ i, IsClosed (t i)) → (s ∩ ⋂ i, t i) = ∅ → ∃ u : Set ι, u.Countable ∧ (s ∩ ⋂ i ∈ u, t i) = ∅ := ⟨fun hs ↦ hs.elim_countable_subfamily_closed, isLindelof_of_countable_subfamily_closed⟩ @[simp] theorem isLindelof_empty : IsLindelof (∅ : Set X) := fun _f hnf _ hsf ↦ Not.elim hnf.ne <\| empty_mem_iff_bot.1 <\| le_principal_iff.1 hsf @[simp] theorem isLindelof_singleton {x : X} : IsLindelof ({x} : Set X) := fun f hf _ hfa ↦ ⟨x, rfl, ClusterPt.of_le_nhds' (hfa.trans <\| by simpa only [principal_singleton] using pure_le_nhds x) hf⟩ theorem Set.Subsingleton.isLindelof (hs : s.Subsingleton) : IsLindelof s := Subsingleton.induction_on hs isLindelof_empty fun _ ↦ isLindelof_singleton theorem Set.Countable.isLindelof_biUnion {s : Set ι} {f : ι → Set X} (hs : s.Countable) (hf : ∀ i ∈ s, IsLindelof (f i)) : IsLindelof (⋃ i ∈ s, f i) := by apply isLindelof_of_countable_subcover intro i U hU hUcover have hiU : ∀ i ∈ s, f i ⊆ ⋃ i, U i := fun _ is ↦ _root_.subset_trans (subset_biUnion_of_mem is) hUcover have iSets := fun i is ↦ (hf i is).elim_countable_subcover U hU (hiU i is) choose! r hr using iSets use ⋃ i ∈ s, r i constructor · refine (Countable.biUnion_iff hs).mpr ?h.left.a exact fun s hs ↦ (hr s hs).1 · refine iUnion₂_subset ?h.right.h intro i is simp only [mem_iUnion, exists_prop, iUnion_exists, biUnion_and'] intro x hx exact mem_biUnion is ((hr i is).2 hx) theorem Set.Finite.isLindelof_biUnion {s : Set ι} {f : ι → Set X} (hs : s.Finite) (hf : ∀ i ∈ s, IsLindelof (f i)) : IsLindelof (⋃ i ∈ s, f i) := Set.Countable.isLindelof_biUnion (countable hs) hf theorem Finset.isLindelof_biUnion (s : Finset ι) {f : ι → Set X} (hf : ∀ i ∈ s, IsLindelof (f i)) : IsLindelof (⋃ i ∈ s, f i) := s.finite_toSet.isLindelof_biUnion hf theorem isLindelof_accumulate {K : ℕ → Set X} (hK : ∀ n, IsLindelof (K n)) (n : ℕ) : IsLindelof (Accumulate K n) := (finite_le_nat n).isLindelof_biUnion fun k _ => hK k theorem Set.Countable.isLindelof_sUnion {S : Set (Set X)} (hf : S.Countable) (hc : ∀ s ∈ S, IsLindelof s) : IsLindelof (⋃₀ S) := by rw [sUnion_eq_biUnion]; exact hf.isLindelof_biUnion hc theorem Set.Finite.isLindelof_sUnion {S : Set (Set X)} (hf : S.Finite) (hc : ∀ s ∈ S, IsLindelof s) : IsLindelof (⋃₀ S) := by rw [sUnion_eq_biUnion]; exact hf.isLindelof_biUnion hc theorem isLindelof_iUnion {ι : Sort} {f : ι → Set X} [Countable ι] (h : ∀ i, IsLindelof (f i)) : IsLindelof (⋃ i, f i) := (countable_range f).isLindelof_sUnion <\| forall_mem_range.2 h theorem Set.Countable.isLindelof (hs : s.Countable) : IsLindelof s := biUnion_of_singleton s ▸ hs.isLindelof_biUnion fun _ _ => isLindelof_singleton theorem Set.Finite.isLindelof (hs : s.Finite) : IsLindelof s := biUnion_of_singleton s ▸ hs.isLindelof_biUnion fun _ _ => isLindelof_singleton theorem IsLindelof.countable_of_discrete [DiscreteTopology X] (hs : IsLindelof s) : s.Countable := by have : ∀ x : X, ({x} : Set X) ∈ 𝓝 x := by simp [nhds_discrete] rcases hs.elim_nhds_subcover (fun x => {x}) fun x _ => this x with ⟨t, ht, _, hssubt⟩ rw [biUnion_of_singleton] at hssubt exact ht.mono hssubt theorem isLindelof_iff_countable [DiscreteTopology X] : IsLindelof s ↔ s.Countable := ⟨fun h => h.countable_of_discrete, fun h => h.isLindelof⟩ theorem IsLindelof.union (hs : IsLindelof s) (ht : IsLindelof t) : IsLindelof (s ∪ t) := by rw [union_eq_iUnion]; exact isLindelof_iUnion fun b => by cases b <;> assumption protected theorem IsLindelof.insert (hs : IsLindelof s) (a) : IsLindelof (insert a s) := isLindelof_singleton.union hs theorem isLindelof_open_iff_eq_countable_iUnion_of_isTopologicalBasis (b : ι → Set X) (hb : IsTopologicalBasis (Set.range b)) (hb' : ∀ i, IsLindelof (b i)) (U : Set X) : IsLindelof U ∧ IsOpen U ↔ ∃ s : Set ι, s.Countable ∧ U = ⋃ i ∈ s, b i := by constructor · rintro ⟨h₁, h₂⟩ obtain ⟨Y, f, rfl, hf⟩ := hb.open_eq_iUnion h₂ choose f' hf' using hf have : b ∘ f' = f := funext hf' subst this obtain ⟨t, ht⟩ := h₁.elim_countable_subcover (b ∘ f') (fun i => hb.isOpen (Set.mem_range_self _)) Subset.rfl refine ⟨t.image f', Countable.image (ht.1) f', le_antisymm ?_ ?_⟩ · refine Set.Subset.trans ht.2 ?_ simp only [Set.iUnion_subset_iff] intro i hi rw [← Set.iUnion_subtype (fun x : ι => x ∈ t.image f') fun i => b i.1] exact Set.subset_iUnion (fun i : t.image f' => b i) ⟨_, mem_image_of_mem _ hi⟩ · apply Set.iUnion₂_subset rintro i hi obtain ⟨j, -, rfl⟩ := (mem_image ..).mp hi exact Set.subset_iUnion (b ∘ f') j · rintro ⟨s, hs, rfl⟩ constructor · exact hs.isLindelof_biUnion fun i _ => hb' i · exact isOpen_biUnion fun i _ => hb.isOpen (Set.mem_range_self _) def Filter.coLindelof (X : Type) [TopologicalSpace X] : Filter X := --`Filter.coLindelof` is the filter generated by complements to Lindelöf sets. ⨅ (s : Set X) (_ : IsLindelof s), 𝓟 sᶜ theorem hasBasis_coLindelof : (coLindelof X).HasBasis IsLindelof compl := hasBasis_biInf_principal' (fun s hs t ht => ⟨s ∪ t, hs.union ht, compl_subset_compl.2 subset_union_left, compl_subset_compl.2 subset_union_right⟩) ⟨∅, isLindelof_empty⟩ theorem mem_coLindelof : s ∈ coLindelof X ↔ ∃ t, IsLindelof t ∧ tᶜ ⊆ s := hasBasis_coLindelof.mem_iff theorem mem_coLindelof' : s ∈ coLindelof X ↔ ∃ t, IsLindelof t ∧ sᶜ ⊆ t := mem_coLindelof.trans <\| exists_congr fun _ => and_congr_right fun _ => compl_subset_comm theorem _root_.IsLindelof.compl_mem_coLindelof (hs : IsLindelof s) : sᶜ ∈ coLindelof X := hasBasis_coLindelof.mem_of_mem hs theorem coLindelof_le_cofinite : coLindelof X ≤ cofinite := fun s hs => compl_compl s ▸ hs.isLindelof.compl_mem_coLindelof theorem Tendsto.isLindelof_insert_range_of_coLindelof {f : X → Y} {y} (hf : Tendsto f (coLindelof X) (𝓝 y)) (hfc : Continuous f) : IsLindelof (insert y (range f)) := by intro l hne _ hle by_cases hy : ClusterPt y l · exact ⟨y, Or.inl rfl, hy⟩ simp only [clusterPt_iff, not_forall, ← not_disjoint_iff_nonempty_inter, not_not] at hy rcases hy with ⟨s, hsy, t, htl, hd⟩ rcases mem_coLindelof.1 (hf hsy) with ⟨K, hKc, hKs⟩ have : f '' K ∈ l := by filter_upwards [htl, le_principal_iff.1 hle] with y hyt hyf rcases hyf with (rfl \| ⟨x, rfl⟩) exacts [(hd.le_bot ⟨mem_of_mem_nhds hsy, hyt⟩).elim, mem_image_of_mem _ (not_not.1 fun hxK => hd.le_bot ⟨hKs hxK, hyt⟩)] rcases hKc.image hfc (le_principal_iff.2 this) with ⟨y, hy, hyl⟩ exact ⟨y, Or.inr <\| image_subset_range _ _ hy, hyl⟩ def Filter.coclosedLindelof (X : Type) [TopologicalSpace X] : Filter X := -- `Filter.coclosedLindelof` is the filter generated by complements to closed Lindelof sets. ⨅ (s : Set X) (_ : IsClosed s) (_ : IsLindelof s), 𝓟 sᶜ theorem hasBasis_coclosedLindelof : (Filter.coclosedLindelof X).HasBasis (fun s => IsClosed s ∧ IsLindelof s) compl := by simp only [Filter.coclosedLindelof, iInf_and'] refine hasBasis_biInf_principal' ?_ ⟨∅, isClosed_empty, isLindelof_empty⟩ rintro s ⟨hs₁, hs₂⟩ t ⟨ht₁, ht₂⟩ exact ⟨s ∪ t, ⟨⟨hs₁.union ht₁, hs₂.union ht₂⟩, compl_subset_compl.2 subset_union_left, compl_subset_compl.2 subset_union_right⟩⟩ theorem mem_coclosedLindelof : s ∈ coclosedLindelof X ↔ ∃ t, IsClosed t ∧ IsLindelof t ∧ tᶜ ⊆ s := by simp only [hasBasis_coclosedLindelof.mem_iff, and_assoc] theorem mem_coclosed_Lindelof' : s ∈ coclosedLindelof X ↔ ∃ t, IsClosed t ∧ IsLindelof t ∧ sᶜ ⊆ t := by simp only [mem_coclosedLindelof, compl_subset_comm] theorem coLindelof_le_coclosedLindelof : coLindelof X ≤ coclosedLindelof X := iInf_mono fun _ => le_iInf fun _ => le_rfl theorem IsLindeof.compl_mem_coclosedLindelof_of_isClosed (hs : IsLindelof s) (hs' : IsClosed s) : sᶜ ∈ Filter.coclosedLindelof X := hasBasis_coclosedLindelof.mem_of_mem ⟨hs', hs⟩ class LindelofSpace (X : Type) [TopologicalSpace X] : Prop where isLindelof_univ : IsLindelof (univ : Set X) instance (priority := 10) Subsingleton.lindelofSpace [Subsingleton X] : LindelofSpace X := ⟨subsingleton_univ.isLindelof⟩ theorem isLindelof_univ_iff : IsLindelof (univ : Set X) ↔ LindelofSpace X := ⟨fun h => ⟨h⟩, fun h => h.1⟩ theorem isLindelof_univ [h : LindelofSpace X] : IsLindelof (univ : Set X) := h.isLindelof_univ theorem cluster_point_of_Lindelof [LindelofSpace X] (f : Filter X) [NeBot f] [CountableInterFilter f] : ∃ x, ClusterPt x f := by simpa using isLindelof_univ (show f ≤ 𝓟 univ by simp) theorem LindelofSpace.elim_nhds_subcover [LindelofSpace X] (U : X → Set X) (hU : ∀ x, U x ∈ 𝓝 x) : ∃ t : Set X, t.Countable ∧ ⋃ x ∈ t, U x = univ := by obtain ⟨t, tc, -, s⟩ := IsLindelof.elim_nhds_subcover isLindelof_univ U fun x _ => hU x use t, tc apply top_unique s theorem lindelofSpace_of_countable_subfamily_closed (h : ∀ {ι : Type u} (t : ι → Set X), (∀ i, IsClosed (t i)) → ⋂ i, t i = ∅ → ∃ u : Set ι, u.Countable ∧ ⋂ i ∈ u, t i = ∅) : LindelofSpace X where isLindelof_univ := isLindelof_of_countable_subfamily_closed fun t => by simpa using h t theorem IsClosed.isLindelof [LindelofSpace X] (h : IsClosed s) : IsLindelof s := isLindelof_univ.of_isClosed_subset h (subset_univ _) theorem IsCompact.isLindelof (hs : IsCompact s) : IsLindelof s := by tauto theorem IsSigmaCompact.isLindelof (hs : IsSigmaCompact s) : IsLindelof s := by rw [IsSigmaCompact] at hs rcases hs with ⟨K, ⟨hc, huniv⟩⟩ rw [← huniv] have hl : ∀ n, IsLindelof (K n) := fun n ↦ IsCompact.isLindelof (hc n) exact isLindelof_iUnion hl instance (priority := 100) [CompactSpace X] : LindelofSpace X := { isLindelof_univ := isCompact_univ.isLindelof} instance (priority := 100) [SigmaCompactSpace X] : LindelofSpace X := { isLindelof_univ := isSigmaCompact_univ.isLindelof} class NonLindelofSpace (X : Type) [TopologicalSpace X] : Prop where nonLindelof_univ : ¬IsLindelof (univ : Set X) lemma nonLindelof_univ (X : Type*) [TopologicalSpace X] [NonLindelofSpace X] : ¬IsLindelof (univ : Set X) := NonLindelofSpace.nonLindelof_univ theorem IsLindelof.ne_univ [NonLindelofSpace X] (hs : IsLindelof s) : s ≠ univ := fun h ↦ nonLindelof_univ X (h ▸ hs) instance [NonLindelofSpace X] : NeBot (Filter.coLindelof X) := by refine hasBasis_coLindelof.neBot_iff.2 fun {s} hs => ?_ contrapose hs rw [not_nonempty_iff_eq_empty, compl_empty_iff] at hs rw [hs] exact nonLindelof_univ X @[simp] theorem Filter.coLindelof_eq_bot [LindelofSpace X] : Filter.coLindelof X = ⊥ := hasBasis_coLindelof.eq_bot_iff.mpr ⟨Set.univ, isLindelof_univ, Set.compl_univ⟩ instance [NonLindelofSpace X] : NeBot (Filter.coclosedLindelof X) := neBot_of_le coLindelof_le_coclosedLindelof theorem nonLindelofSpace_of_neBot (_ : NeBot (Filter.coLindelof X)) : NonLindelofSpace X := ⟨fun h' => (Filter.nonempty_of_mem h'.compl_mem_coLindelof).ne_empty compl_univ⟩ theorem Filter.coLindelof_neBot_iff : NeBot (Filter.coLindelof X) ↔ NonLindelofSpace X := ⟨nonLindelofSpace_of_neBot, fun _ => inferInstance⟩ theorem not_LindelofSpace_iff : ¬LindelofSpace X ↔ NonLindelofSpace X := ⟨fun h₁ => ⟨fun h₂ => h₁ ⟨h₂⟩⟩, fun ⟨h₁⟩ ⟨h₂⟩ => h₁ h₂⟩ instance (priority := 100) [CompactSpace X] : LindelofSpace X := { isLindelof_univ := isCompact_univ.isLindelof} theorem countable_of_Lindelof_of_discrete [LindelofSpace X] [DiscreteTopology X] : Countable X := countable_univ_iff.mp isLindelof_univ.countable_of_discrete theorem countable_cover_nhds_interior [LindelofSpace X] {U : X → Set X} (hU : ∀ x, U x ∈ 𝓝 x) : ∃ t : Set X, t.Countable ∧ ⋃ x ∈ t, interior (U x) = univ := let ⟨t, ht⟩ := isLindelof_univ.elim_countable_subcover (fun x => interior (U x)) (fun _ => isOpen_interior) fun x _ => mem_iUnion.2 ⟨x, mem_interior_iff_mem_nhds.2 (hU x)⟩ ⟨t, ⟨ht.1, univ_subset_iff.1 ht.2⟩⟩ theorem countable_cover_nhds [LindelofSpace X] {U : X → Set X} (hU : ∀ x, U x ∈ 𝓝 x) : ∃ t : Set X, t.Countable ∧ ⋃ x ∈ t, U x = univ := let ⟨t, ht⟩ := countable_cover_nhds_interior hU ⟨t, ⟨ht.1, univ_subset_iff.1 <\| ht.2.symm.subset.trans <\| iUnion₂_mono fun _ _ => interior_subset⟩⟩ theorem Filter.comap_coLindelof_le {f : X → Y} (hf : Continuous f) : (Filter.coLindelof Y).comap f ≤ Filter.coLindelof X := by rw [(hasBasis_coLindelof.comap f).le_basis_iff hasBasis_coLindelof] intro t ht refine ⟨f '' t, ht.image hf, ?_⟩ simpa using t.subset_preimage_image f theorem isLindelof_range [LindelofSpace X] {f : X → Y} (hf : Continuous f) : IsLindelof (range f) := by rw [← image_univ]; exact isLindelof_univ.image hf theorem isLindelof_diagonal [LindelofSpace X] : IsLindelof (diagonal X) := @range_diag X ▸ isLindelof_range (continuous_id.prod_mk continuous_id) theorem Inducing.isLindelof_iff {f : X → Y} (hf : Inducing f) : IsLindelof s ↔ IsLindelof (f '' s) := by refine ⟨fun hs => hs.image hf.continuous, fun hs F F_ne_bot _ F_le => ?_⟩ obtain ⟨_, ⟨x, x_in : x ∈ s, rfl⟩, hx : ClusterPt (f x) (map f F)⟩ := hs ((map_mono F_le).trans_eq map_principal) exact ⟨x, x_in, hf.mapClusterPt_iff.1 hx⟩ theorem Embedding.isLindelof_iff {f : X → Y} (hf : Embedding f) : IsLindelof s ↔ IsLindelof (f '' s) := hf.toInducing.isLindelof_iff	Mathlib/Topology/Compactness/Lindelof.lean	603	606	theorem Inducing.isLindelof_preimage {f : X → Y} (hf : Inducing f) (hf' : IsClosed (range f)) {K : Set Y} (hK : IsLindelof K) : IsLindelof (f ⁻¹' K) := by	replace hK := hK.inter_right hf' rwa [hf.isLindelof_iff, image_preimage_eq_inter_range]
import Mathlib.LinearAlgebra.AffineSpace.Independent import Mathlib.LinearAlgebra.Basis #align_import linear_algebra.affine_space.basis from "leanprover-community/mathlib"@"2de9c37fa71dde2f1c6feff19876dd6a7b1519f0" open Affine open Set universe u₁ u₂ u₃ u₄ structure AffineBasis (ι : Type u₁) (k : Type u₂) {V : Type u₃} (P : Type u₄) [AddCommGroup V] [AffineSpace V P] [Ring k] [Module k V] where protected toFun : ι → P protected ind' : AffineIndependent k toFun protected tot' : affineSpan k (range toFun) = ⊤ #align affine_basis AffineBasis variable {ι ι' k V P : Type*} [AddCommGroup V] [AffineSpace V P] namespace AffineBasis section Ring variable [Ring k] [Module k V] (b : AffineBasis ι k P) {s : Finset ι} {i j : ι} (e : ι ≃ ι') instance : Inhabited (AffineBasis PUnit k PUnit) := ⟨⟨id, affineIndependent_of_subsingleton k id, by simp⟩⟩ instance instFunLike : FunLike (AffineBasis ι k P) ι P where coe := AffineBasis.toFun coe_injective' f g h := by cases f; cases g; congr #align affine_basis.fun_like AffineBasis.instFunLike @[ext] theorem ext {b₁ b₂ : AffineBasis ι k P} (h : (b₁ : ι → P) = b₂) : b₁ = b₂ := DFunLike.coe_injective h #align affine_basis.ext AffineBasis.ext theorem ind : AffineIndependent k b := b.ind' #align affine_basis.ind AffineBasis.ind theorem tot : affineSpan k (range b) = ⊤ := b.tot' #align affine_basis.tot AffineBasis.tot protected theorem nonempty : Nonempty ι := not_isEmpty_iff.mp fun hι => by simpa only [@range_eq_empty _ _ hι, AffineSubspace.span_empty, bot_ne_top] using b.tot #align affine_basis.nonempty AffineBasis.nonempty def reindex (e : ι ≃ ι') : AffineBasis ι' k P := ⟨b ∘ e.symm, b.ind.comp_embedding e.symm.toEmbedding, by rw [e.symm.surjective.range_comp] exact b.3⟩ #align affine_basis.reindex AffineBasis.reindex @[simp, norm_cast] theorem coe_reindex : ⇑(b.reindex e) = b ∘ e.symm := rfl #align affine_basis.coe_reindex AffineBasis.coe_reindex @[simp] theorem reindex_apply (i' : ι') : b.reindex e i' = b (e.symm i') := rfl #align affine_basis.reindex_apply AffineBasis.reindex_apply @[simp] theorem reindex_refl : b.reindex (Equiv.refl _) = b := ext rfl #align affine_basis.reindex_refl AffineBasis.reindex_refl noncomputable def basisOf (i : ι) : Basis { j : ι // j ≠ i } k V := Basis.mk ((affineIndependent_iff_linearIndependent_vsub k b i).mp b.ind) (by suffices Submodule.span k (range fun j : { x // x ≠ i } => b ↑j -ᵥ b i) = vectorSpan k (range b) by rw [this, ← direction_affineSpan, b.tot, AffineSubspace.direction_top] conv_rhs => rw [← image_univ] rw [vectorSpan_image_eq_span_vsub_set_right_ne k b (mem_univ i)] congr ext v simp) #align affine_basis.basis_of AffineBasis.basisOf @[simp] theorem basisOf_apply (i : ι) (j : { j : ι // j ≠ i }) : b.basisOf i j = b ↑j -ᵥ b i := by simp [basisOf] #align affine_basis.basis_of_apply AffineBasis.basisOf_apply @[simp] theorem basisOf_reindex (i : ι') : (b.reindex e).basisOf i = (b.basisOf <\| e.symm i).reindex (e.subtypeEquiv fun _ => e.eq_symm_apply.not) := by ext j simp #align affine_basis.basis_of_reindex AffineBasis.basisOf_reindex noncomputable def coord (i : ι) : P →ᵃ[k] k where toFun q := 1 - (b.basisOf i).sumCoords (q -ᵥ b i) linear := -(b.basisOf i).sumCoords map_vadd' q v := by dsimp only rw [vadd_vsub_assoc, LinearMap.map_add, vadd_eq_add, LinearMap.neg_apply, sub_add_eq_sub_sub_swap, add_comm, sub_eq_add_neg] #align affine_basis.coord AffineBasis.coord @[simp] theorem linear_eq_sumCoords (i : ι) : (b.coord i).linear = -(b.basisOf i).sumCoords := rfl #align affine_basis.linear_eq_sum_coords AffineBasis.linear_eq_sumCoords @[simp] theorem coord_reindex (i : ι') : (b.reindex e).coord i = b.coord (e.symm i) := by ext classical simp [AffineBasis.coord] #align affine_basis.coord_reindex AffineBasis.coord_reindex @[simp] theorem coord_apply_eq (i : ι) : b.coord i (b i) = 1 := by simp only [coord, Basis.coe_sumCoords, LinearEquiv.map_zero, LinearEquiv.coe_coe, sub_zero, AffineMap.coe_mk, Finsupp.sum_zero_index, vsub_self] #align affine_basis.coord_apply_eq AffineBasis.coord_apply_eq @[simp] theorem coord_apply_ne (h : i ≠ j) : b.coord i (b j) = 0 := by -- Porting note: -- in mathlib3 we didn't need to given the `fun j => j ≠ i` argument to `Subtype.coe_mk`, -- but I don't think we can complain: this proof was over-golfed. rw [coord, AffineMap.coe_mk, ← @Subtype.coe_mk _ (fun j => j ≠ i) j h.symm, ← b.basisOf_apply, Basis.sumCoords_self_apply, sub_self] #align affine_basis.coord_apply_ne AffineBasis.coord_apply_ne theorem coord_apply [DecidableEq ι] (i j : ι) : b.coord i (b j) = if i = j then 1 else 0 := by rcases eq_or_ne i j with h \| h <;> simp [h] #align affine_basis.coord_apply AffineBasis.coord_apply @[simp] theorem coord_apply_combination_of_mem (hi : i ∈ s) {w : ι → k} (hw : s.sum w = 1) : b.coord i (s.affineCombination k b w) = w i := by classical simp only [coord_apply, hi, Finset.affineCombination_eq_linear_combination, if_true, mul_boole, hw, Function.comp_apply, smul_eq_mul, s.sum_ite_eq, s.map_affineCombination b w hw] #align affine_basis.coord_apply_combination_of_mem AffineBasis.coord_apply_combination_of_mem @[simp] theorem coord_apply_combination_of_not_mem (hi : i ∉ s) {w : ι → k} (hw : s.sum w = 1) : b.coord i (s.affineCombination k b w) = 0 := by classical simp only [coord_apply, hi, Finset.affineCombination_eq_linear_combination, if_false, mul_boole, hw, Function.comp_apply, smul_eq_mul, s.sum_ite_eq, s.map_affineCombination b w hw] #align affine_basis.coord_apply_combination_of_not_mem AffineBasis.coord_apply_combination_of_not_mem @[simp] theorem sum_coord_apply_eq_one [Fintype ι] (q : P) : ∑ i, b.coord i q = 1 := by have hq : q ∈ affineSpan k (range b) := by rw [b.tot] exact AffineSubspace.mem_top k V q obtain ⟨w, hw, rfl⟩ := eq_affineCombination_of_mem_affineSpan_of_fintype hq convert hw exact b.coord_apply_combination_of_mem (Finset.mem_univ _) hw #align affine_basis.sum_coord_apply_eq_one AffineBasis.sum_coord_apply_eq_one @[simp] theorem affineCombination_coord_eq_self [Fintype ι] (q : P) : (Finset.univ.affineCombination k b fun i => b.coord i q) = q := by have hq : q ∈ affineSpan k (range b) := by rw [b.tot] exact AffineSubspace.mem_top k V q obtain ⟨w, hw, rfl⟩ := eq_affineCombination_of_mem_affineSpan_of_fintype hq congr ext i exact b.coord_apply_combination_of_mem (Finset.mem_univ i) hw #align affine_basis.affine_combination_coord_eq_self AffineBasis.affineCombination_coord_eq_self @[simp] theorem linear_combination_coord_eq_self [Fintype ι] (b : AffineBasis ι k V) (v : V) : ∑ i, b.coord i v • b i = v := by have hb := b.affineCombination_coord_eq_self v rwa [Finset.univ.affineCombination_eq_linear_combination _ _ (b.sum_coord_apply_eq_one v)] at hb #align affine_basis.linear_combination_coord_eq_self AffineBasis.linear_combination_coord_eq_self theorem ext_elem [Finite ι] {q₁ q₂ : P} (h : ∀ i, b.coord i q₁ = b.coord i q₂) : q₁ = q₂ := by cases nonempty_fintype ι rw [← b.affineCombination_coord_eq_self q₁, ← b.affineCombination_coord_eq_self q₂] simp only [h] #align affine_basis.ext_elem AffineBasis.ext_elem @[simp]	Mathlib/LinearAlgebra/AffineSpace/Basis.lean	240	252	theorem coe_coord_of_subsingleton_eq_one [Subsingleton ι] (i : ι) : (b.coord i : P → k) = 1 := by	ext q have hp : (range b).Subsingleton := by rw [← image_univ] apply Subsingleton.image apply subsingleton_of_subsingleton haveI := AffineSubspace.subsingleton_of_subsingleton_span_eq_top hp b.tot let s : Finset ι := {i} have hi : i ∈ s := by simp [s] have hw : s.sum (Function.const ι (1 : k)) = 1 := by simp [s] have hq : q = s.affineCombination k b (Function.const ι (1 : k)) := by simp [eq_iff_true_of_subsingleton] rw [Pi.one_apply, hq, b.coord_apply_combination_of_mem hi hw, Function.const_apply]
import Mathlib.MeasureTheory.Function.L1Space import Mathlib.Analysis.NormedSpace.IndicatorFunction #align_import measure_theory.integral.integrable_on from "leanprover-community/mathlib"@"8b8ba04e2f326f3f7cf24ad129beda58531ada61" noncomputable section open Set Filter TopologicalSpace MeasureTheory Function open scoped Classical Topology Interval Filter ENNReal MeasureTheory variable {α β E F : Type*} [MeasurableSpace α] section variable [TopologicalSpace β] {l l' : Filter α} {f g : α → β} {μ ν : Measure α} def StronglyMeasurableAtFilter (f : α → β) (l : Filter α) (μ : Measure α := by volume_tac) := ∃ s ∈ l, AEStronglyMeasurable f (μ.restrict s) #align strongly_measurable_at_filter StronglyMeasurableAtFilter @[simp] theorem stronglyMeasurableAt_bot {f : α → β} : StronglyMeasurableAtFilter f ⊥ μ := ⟨∅, mem_bot, by simp⟩ #align strongly_measurable_at_bot stronglyMeasurableAt_bot protected theorem StronglyMeasurableAtFilter.eventually (h : StronglyMeasurableAtFilter f l μ) : ∀ᶠ s in l.smallSets, AEStronglyMeasurable f (μ.restrict s) := (eventually_smallSets' fun _ _ => AEStronglyMeasurable.mono_set).2 h #align strongly_measurable_at_filter.eventually StronglyMeasurableAtFilter.eventually protected theorem StronglyMeasurableAtFilter.filter_mono (h : StronglyMeasurableAtFilter f l μ) (h' : l' ≤ l) : StronglyMeasurableAtFilter f l' μ := let ⟨s, hsl, hs⟩ := h ⟨s, h' hsl, hs⟩ #align strongly_measurable_at_filter.filter_mono StronglyMeasurableAtFilter.filter_mono protected theorem MeasureTheory.AEStronglyMeasurable.stronglyMeasurableAtFilter (h : AEStronglyMeasurable f μ) : StronglyMeasurableAtFilter f l μ := ⟨univ, univ_mem, by rwa [Measure.restrict_univ]⟩ #align measure_theory.ae_strongly_measurable.strongly_measurable_at_filter MeasureTheory.AEStronglyMeasurable.stronglyMeasurableAtFilter theorem AeStronglyMeasurable.stronglyMeasurableAtFilter_of_mem {s} (h : AEStronglyMeasurable f (μ.restrict s)) (hl : s ∈ l) : StronglyMeasurableAtFilter f l μ := ⟨s, hl, h⟩ #align ae_strongly_measurable.strongly_measurable_at_filter_of_mem AeStronglyMeasurable.stronglyMeasurableAtFilter_of_mem protected theorem MeasureTheory.StronglyMeasurable.stronglyMeasurableAtFilter (h : StronglyMeasurable f) : StronglyMeasurableAtFilter f l μ := h.aestronglyMeasurable.stronglyMeasurableAtFilter #align measure_theory.strongly_measurable.strongly_measurable_at_filter MeasureTheory.StronglyMeasurable.stronglyMeasurableAtFilter end namespace MeasureTheory section NormedAddCommGroup theorem hasFiniteIntegral_restrict_of_bounded [NormedAddCommGroup E] {f : α → E} {s : Set α} {μ : Measure α} {C} (hs : μ s < ∞) (hf : ∀ᵐ x ∂μ.restrict s, ‖f x‖ ≤ C) : HasFiniteIntegral f (μ.restrict s) := haveI : IsFiniteMeasure (μ.restrict s) := ⟨by rwa [Measure.restrict_apply_univ]⟩ hasFiniteIntegral_of_bounded hf #align measure_theory.has_finite_integral_restrict_of_bounded MeasureTheory.hasFiniteIntegral_restrict_of_bounded variable [NormedAddCommGroup E] {f g : α → E} {s t : Set α} {μ ν : Measure α} def IntegrableOn (f : α → E) (s : Set α) (μ : Measure α := by volume_tac) : Prop := Integrable f (μ.restrict s) #align measure_theory.integrable_on MeasureTheory.IntegrableOn theorem IntegrableOn.integrable (h : IntegrableOn f s μ) : Integrable f (μ.restrict s) := h #align measure_theory.integrable_on.integrable MeasureTheory.IntegrableOn.integrable @[simp] theorem integrableOn_empty : IntegrableOn f ∅ μ := by simp [IntegrableOn, integrable_zero_measure] #align measure_theory.integrable_on_empty MeasureTheory.integrableOn_empty @[simp] theorem integrableOn_univ : IntegrableOn f univ μ ↔ Integrable f μ := by rw [IntegrableOn, Measure.restrict_univ] #align measure_theory.integrable_on_univ MeasureTheory.integrableOn_univ theorem integrableOn_zero : IntegrableOn (fun _ => (0 : E)) s μ := integrable_zero _ _ _ #align measure_theory.integrable_on_zero MeasureTheory.integrableOn_zero @[simp] theorem integrableOn_const {C : E} : IntegrableOn (fun _ => C) s μ ↔ C = 0 ∨ μ s < ∞ := integrable_const_iff.trans <\| by rw [Measure.restrict_apply_univ] #align measure_theory.integrable_on_const MeasureTheory.integrableOn_const theorem IntegrableOn.mono (h : IntegrableOn f t ν) (hs : s ⊆ t) (hμ : μ ≤ ν) : IntegrableOn f s μ := h.mono_measure <\| Measure.restrict_mono hs hμ #align measure_theory.integrable_on.mono MeasureTheory.IntegrableOn.mono theorem IntegrableOn.mono_set (h : IntegrableOn f t μ) (hst : s ⊆ t) : IntegrableOn f s μ := h.mono hst le_rfl #align measure_theory.integrable_on.mono_set MeasureTheory.IntegrableOn.mono_set theorem IntegrableOn.mono_measure (h : IntegrableOn f s ν) (hμ : μ ≤ ν) : IntegrableOn f s μ := h.mono (Subset.refl _) hμ #align measure_theory.integrable_on.mono_measure MeasureTheory.IntegrableOn.mono_measure theorem IntegrableOn.mono_set_ae (h : IntegrableOn f t μ) (hst : s ≤ᵐ[μ] t) : IntegrableOn f s μ := h.integrable.mono_measure <\| Measure.restrict_mono_ae hst #align measure_theory.integrable_on.mono_set_ae MeasureTheory.IntegrableOn.mono_set_ae theorem IntegrableOn.congr_set_ae (h : IntegrableOn f t μ) (hst : s =ᵐ[μ] t) : IntegrableOn f s μ := h.mono_set_ae hst.le #align measure_theory.integrable_on.congr_set_ae MeasureTheory.IntegrableOn.congr_set_ae theorem IntegrableOn.congr_fun_ae (h : IntegrableOn f s μ) (hst : f =ᵐ[μ.restrict s] g) : IntegrableOn g s μ := Integrable.congr h hst #align measure_theory.integrable_on.congr_fun_ae MeasureTheory.IntegrableOn.congr_fun_ae theorem integrableOn_congr_fun_ae (hst : f =ᵐ[μ.restrict s] g) : IntegrableOn f s μ ↔ IntegrableOn g s μ := ⟨fun h => h.congr_fun_ae hst, fun h => h.congr_fun_ae hst.symm⟩ #align measure_theory.integrable_on_congr_fun_ae MeasureTheory.integrableOn_congr_fun_ae theorem IntegrableOn.congr_fun (h : IntegrableOn f s μ) (hst : EqOn f g s) (hs : MeasurableSet s) : IntegrableOn g s μ := h.congr_fun_ae ((ae_restrict_iff' hs).2 (eventually_of_forall hst)) #align measure_theory.integrable_on.congr_fun MeasureTheory.IntegrableOn.congr_fun theorem integrableOn_congr_fun (hst : EqOn f g s) (hs : MeasurableSet s) : IntegrableOn f s μ ↔ IntegrableOn g s μ := ⟨fun h => h.congr_fun hst hs, fun h => h.congr_fun hst.symm hs⟩ #align measure_theory.integrable_on_congr_fun MeasureTheory.integrableOn_congr_fun theorem Integrable.integrableOn (h : Integrable f μ) : IntegrableOn f s μ := h.mono_measure <\| Measure.restrict_le_self #align measure_theory.integrable.integrable_on MeasureTheory.Integrable.integrableOn theorem IntegrableOn.restrict (h : IntegrableOn f s μ) (hs : MeasurableSet s) : IntegrableOn f s (μ.restrict t) := by rw [IntegrableOn, Measure.restrict_restrict hs]; exact h.mono_set inter_subset_left #align measure_theory.integrable_on.restrict MeasureTheory.IntegrableOn.restrict theorem IntegrableOn.inter_of_restrict (h : IntegrableOn f s (μ.restrict t)) : IntegrableOn f (s ∩ t) μ := by have := h.mono_set (inter_subset_left (t := t)) rwa [IntegrableOn, μ.restrict_restrict_of_subset inter_subset_right] at this lemma Integrable.piecewise [DecidablePred (· ∈ s)] (hs : MeasurableSet s) (hf : IntegrableOn f s μ) (hg : IntegrableOn g sᶜ μ) : Integrable (s.piecewise f g) μ := by rw [IntegrableOn] at hf hg rw [← memℒp_one_iff_integrable] at hf hg ⊢ exact Memℒp.piecewise hs hf hg theorem IntegrableOn.left_of_union (h : IntegrableOn f (s ∪ t) μ) : IntegrableOn f s μ := h.mono_set subset_union_left #align measure_theory.integrable_on.left_of_union MeasureTheory.IntegrableOn.left_of_union theorem IntegrableOn.right_of_union (h : IntegrableOn f (s ∪ t) μ) : IntegrableOn f t μ := h.mono_set subset_union_right #align measure_theory.integrable_on.right_of_union MeasureTheory.IntegrableOn.right_of_union theorem IntegrableOn.union (hs : IntegrableOn f s μ) (ht : IntegrableOn f t μ) : IntegrableOn f (s ∪ t) μ := (hs.add_measure ht).mono_measure <\| Measure.restrict_union_le _ _ #align measure_theory.integrable_on.union MeasureTheory.IntegrableOn.union @[simp] theorem integrableOn_union : IntegrableOn f (s ∪ t) μ ↔ IntegrableOn f s μ ∧ IntegrableOn f t μ := ⟨fun h => ⟨h.left_of_union, h.right_of_union⟩, fun h => h.1.union h.2⟩ #align measure_theory.integrable_on_union MeasureTheory.integrableOn_union @[simp] theorem integrableOn_singleton_iff {x : α} [MeasurableSingletonClass α] : IntegrableOn f {x} μ ↔ f x = 0 ∨ μ {x} < ∞ := by have : f =ᵐ[μ.restrict {x}] fun _ => f x := by filter_upwards [ae_restrict_mem (measurableSet_singleton x)] with _ ha simp only [mem_singleton_iff.1 ha] rw [IntegrableOn, integrable_congr this, integrable_const_iff] simp #align measure_theory.integrable_on_singleton_iff MeasureTheory.integrableOn_singleton_iff @[simp] theorem integrableOn_finite_biUnion {s : Set β} (hs : s.Finite) {t : β → Set α} : IntegrableOn f (⋃ i ∈ s, t i) μ ↔ ∀ i ∈ s, IntegrableOn f (t i) μ := by refine hs.induction_on ?_ ?_ · simp · intro a s _ _ hf; simp [hf, or_imp, forall_and] #align measure_theory.integrable_on_finite_bUnion MeasureTheory.integrableOn_finite_biUnion @[simp] theorem integrableOn_finset_iUnion {s : Finset β} {t : β → Set α} : IntegrableOn f (⋃ i ∈ s, t i) μ ↔ ∀ i ∈ s, IntegrableOn f (t i) μ := integrableOn_finite_biUnion s.finite_toSet #align measure_theory.integrable_on_finset_Union MeasureTheory.integrableOn_finset_iUnion @[simp] theorem integrableOn_finite_iUnion [Finite β] {t : β → Set α} : IntegrableOn f (⋃ i, t i) μ ↔ ∀ i, IntegrableOn f (t i) μ := by cases nonempty_fintype β simpa using @integrableOn_finset_iUnion _ _ _ _ _ f μ Finset.univ t #align measure_theory.integrable_on_finite_Union MeasureTheory.integrableOn_finite_iUnion theorem IntegrableOn.add_measure (hμ : IntegrableOn f s μ) (hν : IntegrableOn f s ν) : IntegrableOn f s (μ + ν) := by delta IntegrableOn; rw [Measure.restrict_add]; exact hμ.integrable.add_measure hν #align measure_theory.integrable_on.add_measure MeasureTheory.IntegrableOn.add_measure @[simp] theorem integrableOn_add_measure : IntegrableOn f s (μ + ν) ↔ IntegrableOn f s μ ∧ IntegrableOn f s ν := ⟨fun h => ⟨h.mono_measure (Measure.le_add_right le_rfl), h.mono_measure (Measure.le_add_left le_rfl)⟩, fun h => h.1.add_measure h.2⟩ #align measure_theory.integrable_on_add_measure MeasureTheory.integrableOn_add_measure theorem _root_.MeasurableEmbedding.integrableOn_map_iff [MeasurableSpace β] {e : α → β} (he : MeasurableEmbedding e) {f : β → E} {μ : Measure α} {s : Set β} : IntegrableOn f s (μ.map e) ↔ IntegrableOn (f ∘ e) (e ⁻¹' s) μ := by simp_rw [IntegrableOn, he.restrict_map, he.integrable_map_iff] #align measurable_embedding.integrable_on_map_iff MeasurableEmbedding.integrableOn_map_iff theorem _root_.MeasurableEmbedding.integrableOn_iff_comap [MeasurableSpace β] {e : α → β} (he : MeasurableEmbedding e) {f : β → E} {μ : Measure β} {s : Set β} (hs : s ⊆ range e) : IntegrableOn f s μ ↔ IntegrableOn (f ∘ e) (e ⁻¹' s) (μ.comap e) := by simp_rw [← he.integrableOn_map_iff, he.map_comap, IntegrableOn, Measure.restrict_restrict_of_subset hs] theorem integrableOn_map_equiv [MeasurableSpace β] (e : α ≃ᵐ β) {f : β → E} {μ : Measure α} {s : Set β} : IntegrableOn f s (μ.map e) ↔ IntegrableOn (f ∘ e) (e ⁻¹' s) μ := by simp only [IntegrableOn, e.restrict_map, integrable_map_equiv e] #align measure_theory.integrable_on_map_equiv MeasureTheory.integrableOn_map_equiv theorem MeasurePreserving.integrableOn_comp_preimage [MeasurableSpace β] {e : α → β} {ν} (h₁ : MeasurePreserving e μ ν) (h₂ : MeasurableEmbedding e) {f : β → E} {s : Set β} : IntegrableOn (f ∘ e) (e ⁻¹' s) μ ↔ IntegrableOn f s ν := (h₁.restrict_preimage_emb h₂ s).integrable_comp_emb h₂ #align measure_theory.measure_preserving.integrable_on_comp_preimage MeasureTheory.MeasurePreserving.integrableOn_comp_preimage theorem MeasurePreserving.integrableOn_image [MeasurableSpace β] {e : α → β} {ν} (h₁ : MeasurePreserving e μ ν) (h₂ : MeasurableEmbedding e) {f : β → E} {s : Set α} : IntegrableOn f (e '' s) ν ↔ IntegrableOn (f ∘ e) s μ := ((h₁.restrict_image_emb h₂ s).integrable_comp_emb h₂).symm #align measure_theory.measure_preserving.integrable_on_image MeasureTheory.MeasurePreserving.integrableOn_image theorem integrable_indicator_iff (hs : MeasurableSet s) : Integrable (indicator s f) μ ↔ IntegrableOn f s μ := by simp [IntegrableOn, Integrable, HasFiniteIntegral, nnnorm_indicator_eq_indicator_nnnorm, ENNReal.coe_indicator, lintegral_indicator _ hs, aestronglyMeasurable_indicator_iff hs] #align measure_theory.integrable_indicator_iff MeasureTheory.integrable_indicator_iff theorem IntegrableOn.integrable_indicator (h : IntegrableOn f s μ) (hs : MeasurableSet s) : Integrable (indicator s f) μ := (integrable_indicator_iff hs).2 h #align measure_theory.integrable_on.integrable_indicator MeasureTheory.IntegrableOn.integrable_indicator theorem Integrable.indicator (h : Integrable f μ) (hs : MeasurableSet s) : Integrable (indicator s f) μ := h.integrableOn.integrable_indicator hs #align measure_theory.integrable.indicator MeasureTheory.Integrable.indicator theorem IntegrableOn.indicator (h : IntegrableOn f s μ) (ht : MeasurableSet t) : IntegrableOn (indicator t f) s μ := Integrable.indicator h ht #align measure_theory.integrable_on.indicator MeasureTheory.IntegrableOn.indicator theorem integrable_indicatorConstLp {E} [NormedAddCommGroup E] {p : ℝ≥0∞} {s : Set α} (hs : MeasurableSet s) (hμs : μ s ≠ ∞) (c : E) : Integrable (indicatorConstLp p hs hμs c) μ := by rw [integrable_congr indicatorConstLp_coeFn, integrable_indicator_iff hs, IntegrableOn, integrable_const_iff, lt_top_iff_ne_top] right simpa only [Set.univ_inter, MeasurableSet.univ, Measure.restrict_apply] using hμs set_option linter.uppercaseLean3 false in #align measure_theory.integrable_indicator_const_Lp MeasureTheory.integrable_indicatorConstLp theorem IntegrableOn.restrict_toMeasurable (hf : IntegrableOn f s μ) (h's : ∀ x ∈ s, f x ≠ 0) : μ.restrict (toMeasurable μ s) = μ.restrict s := by rcases exists_seq_strictAnti_tendsto (0 : ℝ) with ⟨u, _, u_pos, u_lim⟩ let v n := toMeasurable (μ.restrict s) { x \| u n ≤ ‖f x‖ } have A : ∀ n, μ (s ∩ v n) ≠ ∞ := by intro n rw [inter_comm, ← Measure.restrict_apply (measurableSet_toMeasurable _ _), measure_toMeasurable] exact (hf.measure_norm_ge_lt_top (u_pos n)).ne apply Measure.restrict_toMeasurable_of_cover _ A intro x hx have : 0 < ‖f x‖ := by simp only [h's x hx, norm_pos_iff, Ne, not_false_iff] obtain ⟨n, hn⟩ : ∃ n, u n < ‖f x‖ := ((tendsto_order.1 u_lim).2 _ this).exists exact mem_iUnion.2 ⟨n, subset_toMeasurable _ _ hn.le⟩ #align measure_theory.integrable_on.restrict_to_measurable MeasureTheory.IntegrableOn.restrict_toMeasurable theorem IntegrableOn.of_ae_diff_eq_zero (hf : IntegrableOn f s μ) (ht : NullMeasurableSet t μ) (h't : ∀ᵐ x ∂μ, x ∈ t \ s → f x = 0) : IntegrableOn f t μ := by let u := { x ∈ s \| f x ≠ 0 } have hu : IntegrableOn f u μ := hf.mono_set fun x hx => hx.1 let v := toMeasurable μ u have A : IntegrableOn f v μ := by rw [IntegrableOn, hu.restrict_toMeasurable] · exact hu · intro x hx; exact hx.2 have B : IntegrableOn f (t \ v) μ := by apply integrableOn_zero.congr filter_upwards [ae_restrict_of_ae h't, ae_restrict_mem₀ (ht.diff (measurableSet_toMeasurable μ u).nullMeasurableSet)] with x hxt hx by_cases h'x : x ∈ s · by_contra H exact hx.2 (subset_toMeasurable μ u ⟨h'x, Ne.symm H⟩) · exact (hxt ⟨hx.1, h'x⟩).symm apply (A.union B).mono_set _ rw [union_diff_self] exact subset_union_right #align measure_theory.integrable_on.of_ae_diff_eq_zero MeasureTheory.IntegrableOn.of_ae_diff_eq_zero theorem IntegrableOn.of_forall_diff_eq_zero (hf : IntegrableOn f s μ) (ht : MeasurableSet t) (h't : ∀ x ∈ t \ s, f x = 0) : IntegrableOn f t μ := hf.of_ae_diff_eq_zero ht.nullMeasurableSet (eventually_of_forall h't) #align measure_theory.integrable_on.of_forall_diff_eq_zero MeasureTheory.IntegrableOn.of_forall_diff_eq_zero theorem IntegrableOn.integrable_of_ae_not_mem_eq_zero (hf : IntegrableOn f s μ) (h't : ∀ᵐ x ∂μ, x ∉ s → f x = 0) : Integrable f μ := by rw [← integrableOn_univ] apply hf.of_ae_diff_eq_zero nullMeasurableSet_univ filter_upwards [h't] with x hx h'x using hx h'x.2 #align measure_theory.integrable_on.integrable_of_ae_not_mem_eq_zero MeasureTheory.IntegrableOn.integrable_of_ae_not_mem_eq_zero theorem IntegrableOn.integrable_of_forall_not_mem_eq_zero (hf : IntegrableOn f s μ) (h't : ∀ x, x ∉ s → f x = 0) : Integrable f μ := hf.integrable_of_ae_not_mem_eq_zero (eventually_of_forall fun x hx => h't x hx) #align measure_theory.integrable_on.integrable_of_forall_not_mem_eq_zero MeasureTheory.IntegrableOn.integrable_of_forall_not_mem_eq_zero theorem integrableOn_iff_integrable_of_support_subset (h1s : support f ⊆ s) : IntegrableOn f s μ ↔ Integrable f μ := by refine ⟨fun h => ?_, fun h => h.integrableOn⟩ refine h.integrable_of_forall_not_mem_eq_zero fun x hx => ?_ contrapose! hx exact h1s (mem_support.2 hx) #align measure_theory.integrable_on_iff_integrable_of_support_subset MeasureTheory.integrableOn_iff_integrable_of_support_subset theorem integrableOn_Lp_of_measure_ne_top {E} [NormedAddCommGroup E] {p : ℝ≥0∞} {s : Set α} (f : Lp E p μ) (hp : 1 ≤ p) (hμs : μ s ≠ ∞) : IntegrableOn f s μ := by refine memℒp_one_iff_integrable.mp ?_ have hμ_restrict_univ : (μ.restrict s) Set.univ < ∞ := by simpa only [Set.univ_inter, MeasurableSet.univ, Measure.restrict_apply, lt_top_iff_ne_top] haveI hμ_finite : IsFiniteMeasure (μ.restrict s) := ⟨hμ_restrict_univ⟩ exact ((Lp.memℒp _).restrict s).memℒp_of_exponent_le hp set_option linter.uppercaseLean3 false in #align measure_theory.integrable_on_Lp_of_measure_ne_top MeasureTheory.integrableOn_Lp_of_measure_ne_top theorem Integrable.lintegral_lt_top {f : α → ℝ} (hf : Integrable f μ) : (∫⁻ x, ENNReal.ofReal (f x) ∂μ) < ∞ := calc (∫⁻ x, ENNReal.ofReal (f x) ∂μ) ≤ ∫⁻ x, ↑‖f x‖₊ ∂μ := lintegral_ofReal_le_lintegral_nnnorm f _ < ∞ := hf.2 #align measure_theory.integrable.lintegral_lt_top MeasureTheory.Integrable.lintegral_lt_top theorem IntegrableOn.set_lintegral_lt_top {f : α → ℝ} {s : Set α} (hf : IntegrableOn f s μ) : (∫⁻ x in s, ENNReal.ofReal (f x) ∂μ) < ∞ := Integrable.lintegral_lt_top hf #align measure_theory.integrable_on.set_lintegral_lt_top MeasureTheory.IntegrableOn.set_lintegral_lt_top def IntegrableAtFilter (f : α → E) (l : Filter α) (μ : Measure α := by volume_tac) := ∃ s ∈ l, IntegrableOn f s μ #align measure_theory.integrable_at_filter MeasureTheory.IntegrableAtFilter variable {l l' : Filter α} theorem _root_.MeasurableEmbedding.integrableAtFilter_map_iff [MeasurableSpace β] {e : α → β} (he : MeasurableEmbedding e) {f : β → E} : IntegrableAtFilter f (l.map e) (μ.map e) ↔ IntegrableAtFilter (f ∘ e) l μ := by simp_rw [IntegrableAtFilter, he.integrableOn_map_iff] constructor <;> rintro ⟨s, hs⟩ · exact ⟨_, hs⟩ · exact ⟨e '' s, by rwa [mem_map, he.injective.preimage_image]⟩	Mathlib/MeasureTheory/Integral/IntegrableOn.lean	411	417	theorem _root_.MeasurableEmbedding.integrableAtFilter_iff_comap [MeasurableSpace β] {e : α → β} (he : MeasurableEmbedding e) {f : β → E} {μ : Measure β} : IntegrableAtFilter f (l.map e) μ ↔ IntegrableAtFilter (f ∘ e) l (μ.comap e) := by	simp_rw [← he.integrableAtFilter_map_iff, IntegrableAtFilter, he.map_comap] constructor <;> rintro ⟨s, hs, int⟩ · exact ⟨s, hs, int.mono_measure <\| μ.restrict_le_self⟩ · exact ⟨_, inter_mem hs range_mem_map, int.inter_of_restrict⟩
import Mathlib.Data.Real.Sqrt import Mathlib.Analysis.NormedSpace.Star.Basic import Mathlib.Analysis.NormedSpace.ContinuousLinearMap import Mathlib.Analysis.NormedSpace.Basic #align_import data.is_R_or_C.basic from "leanprover-community/mathlib"@"baa88307f3e699fa7054ef04ec79fa4f056169cb" section local notation "𝓚" => algebraMap ℝ _ open ComplexConjugate class RCLike (K : semiOutParam Type) extends DenselyNormedField K, StarRing K, NormedAlgebra ℝ K, CompleteSpace K where re : K →+ ℝ im : K →+ ℝ I : K I_re_ax : re I = 0 I_mul_I_ax : I = 0 ∨ I I = -1 re_add_im_ax : ∀ z : K, 𝓚 (re z) + 𝓚 (im z) * I = z ofReal_re_ax : ∀ r : ℝ, re (𝓚 r) = r ofReal_im_ax : ∀ r : ℝ, im (𝓚 r) = 0 mul_re_ax : ∀ z w : K, re (z * w) = re z * re w - im z * im w mul_im_ax : ∀ z w : K, im (z * w) = re z * im w + im z * re w conj_re_ax : ∀ z : K, re (conj z) = re z conj_im_ax : ∀ z : K, im (conj z) = -im z conj_I_ax : conj I = -I norm_sq_eq_def_ax : ∀ z : K, ‖z‖ ^ 2 = re z * re z + im z * im z mul_im_I_ax : ∀ z : K, im z * im I = im z [toPartialOrder : PartialOrder K] le_iff_re_im {z w : K} : z ≤ w ↔ re z ≤ re w ∧ im z = im w -- note we cannot put this in the `extends` clause [toDecidableEq : DecidableEq K] #align is_R_or_C RCLike scoped[ComplexOrder] attribute [instance 100] RCLike.toPartialOrder attribute [instance 100] RCLike.toDecidableEq end variable {K E : Type} [RCLike K] namespace RCLike open ComplexConjugate @[coe] abbrev ofReal : ℝ → K := Algebra.cast noncomputable instance (priority := 900) algebraMapCoe : CoeTC ℝ K := ⟨ofReal⟩ #align is_R_or_C.algebra_map_coe RCLike.algebraMapCoe theorem ofReal_alg (x : ℝ) : (x : K) = x • (1 : K) := Algebra.algebraMap_eq_smul_one x #align is_R_or_C.of_real_alg RCLike.ofReal_alg theorem real_smul_eq_coe_mul (r : ℝ) (z : K) : r • z = (r : K) z := Algebra.smul_def r z #align is_R_or_C.real_smul_eq_coe_mul RCLike.real_smul_eq_coe_mul theorem real_smul_eq_coe_smul [AddCommGroup E] [Module K E] [Module ℝ E] [IsScalarTower ℝ K E] (r : ℝ) (x : E) : r • x = (r : K) • x := by rw [RCLike.ofReal_alg, smul_one_smul] #align is_R_or_C.real_smul_eq_coe_smul RCLike.real_smul_eq_coe_smul theorem algebraMap_eq_ofReal : ⇑(algebraMap ℝ K) = ofReal := rfl #align is_R_or_C.algebra_map_eq_of_real RCLike.algebraMap_eq_ofReal @[simp, rclike_simps] theorem re_add_im (z : K) : (re z : K) + im z * I = z := RCLike.re_add_im_ax z #align is_R_or_C.re_add_im RCLike.re_add_im @[simp, norm_cast, rclike_simps] theorem ofReal_re : ∀ r : ℝ, re (r : K) = r := RCLike.ofReal_re_ax #align is_R_or_C.of_real_re RCLike.ofReal_re @[simp, norm_cast, rclike_simps] theorem ofReal_im : ∀ r : ℝ, im (r : K) = 0 := RCLike.ofReal_im_ax #align is_R_or_C.of_real_im RCLike.ofReal_im @[simp, rclike_simps] theorem mul_re : ∀ z w : K, re (z * w) = re z * re w - im z * im w := RCLike.mul_re_ax #align is_R_or_C.mul_re RCLike.mul_re @[simp, rclike_simps] theorem mul_im : ∀ z w : K, im (z * w) = re z * im w + im z * re w := RCLike.mul_im_ax #align is_R_or_C.mul_im RCLike.mul_im theorem ext_iff {z w : K} : z = w ↔ re z = re w ∧ im z = im w := ⟨fun h => h ▸ ⟨rfl, rfl⟩, fun ⟨h₁, h₂⟩ => re_add_im z ▸ re_add_im w ▸ h₁ ▸ h₂ ▸ rfl⟩ #align is_R_or_C.ext_iff RCLike.ext_iff theorem ext {z w : K} (hre : re z = re w) (him : im z = im w) : z = w := ext_iff.2 ⟨hre, him⟩ #align is_R_or_C.ext RCLike.ext @[norm_cast] theorem ofReal_zero : ((0 : ℝ) : K) = 0 := algebraMap.coe_zero #align is_R_or_C.of_real_zero RCLike.ofReal_zero @[rclike_simps] theorem zero_re' : re (0 : K) = (0 : ℝ) := map_zero re #align is_R_or_C.zero_re' RCLike.zero_re' @[norm_cast] theorem ofReal_one : ((1 : ℝ) : K) = 1 := map_one (algebraMap ℝ K) #align is_R_or_C.of_real_one RCLike.ofReal_one @[simp, rclike_simps] theorem one_re : re (1 : K) = 1 := by rw [← ofReal_one, ofReal_re] #align is_R_or_C.one_re RCLike.one_re @[simp, rclike_simps] theorem one_im : im (1 : K) = 0 := by rw [← ofReal_one, ofReal_im] #align is_R_or_C.one_im RCLike.one_im theorem ofReal_injective : Function.Injective ((↑) : ℝ → K) := (algebraMap ℝ K).injective #align is_R_or_C.of_real_injective RCLike.ofReal_injective @[norm_cast] theorem ofReal_inj {z w : ℝ} : (z : K) = (w : K) ↔ z = w := algebraMap.coe_inj #align is_R_or_C.of_real_inj RCLike.ofReal_inj -- replaced by `RCLike.ofNat_re` #noalign is_R_or_C.bit0_re #noalign is_R_or_C.bit1_re -- replaced by `RCLike.ofNat_im` #noalign is_R_or_C.bit0_im #noalign is_R_or_C.bit1_im theorem ofReal_eq_zero {x : ℝ} : (x : K) = 0 ↔ x = 0 := algebraMap.lift_map_eq_zero_iff x #align is_R_or_C.of_real_eq_zero RCLike.ofReal_eq_zero theorem ofReal_ne_zero {x : ℝ} : (x : K) ≠ 0 ↔ x ≠ 0 := ofReal_eq_zero.not #align is_R_or_C.of_real_ne_zero RCLike.ofReal_ne_zero @[simp, rclike_simps, norm_cast] theorem ofReal_add (r s : ℝ) : ((r + s : ℝ) : K) = r + s := algebraMap.coe_add _ _ #align is_R_or_C.of_real_add RCLike.ofReal_add -- replaced by `RCLike.ofReal_ofNat` #noalign is_R_or_C.of_real_bit0 #noalign is_R_or_C.of_real_bit1 @[simp, norm_cast, rclike_simps] theorem ofReal_neg (r : ℝ) : ((-r : ℝ) : K) = -r := algebraMap.coe_neg r #align is_R_or_C.of_real_neg RCLike.ofReal_neg @[simp, norm_cast, rclike_simps] theorem ofReal_sub (r s : ℝ) : ((r - s : ℝ) : K) = r - s := map_sub (algebraMap ℝ K) r s #align is_R_or_C.of_real_sub RCLike.ofReal_sub @[simp, rclike_simps, norm_cast] theorem ofReal_sum {α : Type} (s : Finset α) (f : α → ℝ) : ((∑ i ∈ s, f i : ℝ) : K) = ∑ i ∈ s, (f i : K) := map_sum (algebraMap ℝ K) _ _ #align is_R_or_C.of_real_sum RCLike.ofReal_sum @[simp, rclike_simps, norm_cast] theorem ofReal_finsupp_sum {α M : Type} [Zero M] (f : α →₀ M) (g : α → M → ℝ) : ((f.sum fun a b => g a b : ℝ) : K) = f.sum fun a b => (g a b : K) := map_finsupp_sum (algebraMap ℝ K) f g #align is_R_or_C.of_real_finsupp_sum RCLike.ofReal_finsupp_sum @[simp, norm_cast, rclike_simps] theorem ofReal_mul (r s : ℝ) : ((r * s : ℝ) : K) = r * s := algebraMap.coe_mul _ _ #align is_R_or_C.of_real_mul RCLike.ofReal_mul @[simp, norm_cast, rclike_simps] theorem ofReal_pow (r : ℝ) (n : ℕ) : ((r ^ n : ℝ) : K) = (r : K) ^ n := map_pow (algebraMap ℝ K) r n #align is_R_or_C.of_real_pow RCLike.ofReal_pow @[simp, rclike_simps, norm_cast] theorem ofReal_prod {α : Type} (s : Finset α) (f : α → ℝ) : ((∏ i ∈ s, f i : ℝ) : K) = ∏ i ∈ s, (f i : K) := map_prod (algebraMap ℝ K) _ _ #align is_R_or_C.of_real_prod RCLike.ofReal_prod @[simp, rclike_simps, norm_cast] theorem ofReal_finsupp_prod {α M : Type} [Zero M] (f : α →₀ M) (g : α → M → ℝ) : ((f.prod fun a b => g a b : ℝ) : K) = f.prod fun a b => (g a b : K) := map_finsupp_prod _ f g #align is_R_or_C.of_real_finsupp_prod RCLike.ofReal_finsupp_prod @[simp, norm_cast, rclike_simps] theorem real_smul_ofReal (r x : ℝ) : r • (x : K) = (r : K) * (x : K) := real_smul_eq_coe_mul _ _ #align is_R_or_C.real_smul_of_real RCLike.real_smul_ofReal @[rclike_simps] theorem re_ofReal_mul (r : ℝ) (z : K) : re (↑r * z) = r * re z := by simp only [mul_re, ofReal_im, zero_mul, ofReal_re, sub_zero] #align is_R_or_C.of_real_mul_re RCLike.re_ofReal_mul @[rclike_simps] theorem im_ofReal_mul (r : ℝ) (z : K) : im (↑r * z) = r * im z := by simp only [add_zero, ofReal_im, zero_mul, ofReal_re, mul_im] #align is_R_or_C.of_real_mul_im RCLike.im_ofReal_mul @[rclike_simps] theorem smul_re (r : ℝ) (z : K) : re (r • z) = r * re z := by rw [real_smul_eq_coe_mul, re_ofReal_mul] #align is_R_or_C.smul_re RCLike.smul_re @[rclike_simps] theorem smul_im (r : ℝ) (z : K) : im (r • z) = r * im z := by rw [real_smul_eq_coe_mul, im_ofReal_mul] #align is_R_or_C.smul_im RCLike.smul_im @[simp, norm_cast, rclike_simps] theorem norm_ofReal (r : ℝ) : ‖(r : K)‖ = \|r\| := norm_algebraMap' K r #align is_R_or_C.norm_of_real RCLike.norm_ofReal -- see Note [lower instance priority] instance (priority := 100) charZero_rclike : CharZero K := (RingHom.charZero_iff (algebraMap ℝ K).injective).1 inferInstance set_option linter.uppercaseLean3 false in #align is_R_or_C.char_zero_R_or_C RCLike.charZero_rclike @[simp, rclike_simps] theorem I_re : re (I : K) = 0 := I_re_ax set_option linter.uppercaseLean3 false in #align is_R_or_C.I_re RCLike.I_re @[simp, rclike_simps] theorem I_im (z : K) : im z * im (I : K) = im z := mul_im_I_ax z set_option linter.uppercaseLean3 false in #align is_R_or_C.I_im RCLike.I_im @[simp, rclike_simps] theorem I_im' (z : K) : im (I : K) * im z = im z := by rw [mul_comm, I_im] set_option linter.uppercaseLean3 false in #align is_R_or_C.I_im' RCLike.I_im' @[rclike_simps] -- porting note (#10618): was `simp` theorem I_mul_re (z : K) : re (I * z) = -im z := by simp only [I_re, zero_sub, I_im', zero_mul, mul_re] set_option linter.uppercaseLean3 false in #align is_R_or_C.I_mul_re RCLike.I_mul_re theorem I_mul_I : (I : K) = 0 ∨ (I : K) * I = -1 := I_mul_I_ax set_option linter.uppercaseLean3 false in #align is_R_or_C.I_mul_I RCLike.I_mul_I variable (𝕜) in lemma I_eq_zero_or_im_I_eq_one : (I : K) = 0 ∨ im (I : K) = 1 := I_mul_I (K := K) \|>.imp_right fun h ↦ by simpa [h] using (I_mul_re (I : K)).symm @[simp, rclike_simps] theorem conj_re (z : K) : re (conj z) = re z := RCLike.conj_re_ax z #align is_R_or_C.conj_re RCLike.conj_re @[simp, rclike_simps] theorem conj_im (z : K) : im (conj z) = -im z := RCLike.conj_im_ax z #align is_R_or_C.conj_im RCLike.conj_im @[simp, rclike_simps] theorem conj_I : conj (I : K) = -I := RCLike.conj_I_ax set_option linter.uppercaseLean3 false in #align is_R_or_C.conj_I RCLike.conj_I @[simp, rclike_simps] theorem conj_ofReal (r : ℝ) : conj (r : K) = (r : K) := by rw [ext_iff] simp only [ofReal_im, conj_im, eq_self_iff_true, conj_re, and_self_iff, neg_zero] #align is_R_or_C.conj_of_real RCLike.conj_ofReal -- replaced by `RCLike.conj_ofNat` #noalign is_R_or_C.conj_bit0 #noalign is_R_or_C.conj_bit1 theorem conj_nat_cast (n : ℕ) : conj (n : K) = n := map_natCast _ _ -- See note [no_index around OfNat.ofNat] theorem conj_ofNat (n : ℕ) [n.AtLeastTwo] : conj (no_index (OfNat.ofNat n : K)) = OfNat.ofNat n := map_ofNat _ _ @[rclike_simps] -- Porting note (#10618): was a `simp` but `simp` can prove it theorem conj_neg_I : conj (-I) = (I : K) := by rw [map_neg, conj_I, neg_neg] set_option linter.uppercaseLean3 false in #align is_R_or_C.conj_neg_I RCLike.conj_neg_I theorem conj_eq_re_sub_im (z : K) : conj z = re z - im z * I := (congr_arg conj (re_add_im z).symm).trans <\| by rw [map_add, map_mul, conj_I, conj_ofReal, conj_ofReal, mul_neg, sub_eq_add_neg] #align is_R_or_C.conj_eq_re_sub_im RCLike.conj_eq_re_sub_im theorem sub_conj (z : K) : z - conj z = 2 * im z * I := calc z - conj z = re z + im z * I - (re z - im z * I) := by rw [re_add_im, ← conj_eq_re_sub_im] _ = 2 * im z * I := by rw [add_sub_sub_cancel, ← two_mul, mul_assoc] #align is_R_or_C.sub_conj RCLike.sub_conj @[rclike_simps] theorem conj_smul (r : ℝ) (z : K) : conj (r • z) = r • conj z := by rw [conj_eq_re_sub_im, conj_eq_re_sub_im, smul_re, smul_im, ofReal_mul, ofReal_mul, real_smul_eq_coe_mul r (_ - _), mul_sub, mul_assoc] #align is_R_or_C.conj_smul RCLike.conj_smul theorem add_conj (z : K) : z + conj z = 2 * re z := calc z + conj z = re z + im z * I + (re z - im z * I) := by rw [re_add_im, conj_eq_re_sub_im] _ = 2 * re z := by rw [add_add_sub_cancel, two_mul] #align is_R_or_C.add_conj RCLike.add_conj theorem re_eq_add_conj (z : K) : ↑(re z) = (z + conj z) / 2 := by rw [add_conj, mul_div_cancel_left₀ (re z : K) two_ne_zero] #align is_R_or_C.re_eq_add_conj RCLike.re_eq_add_conj theorem im_eq_conj_sub (z : K) : ↑(im z) = I * (conj z - z) / 2 := by rw [← neg_inj, ← ofReal_neg, ← I_mul_re, re_eq_add_conj, map_mul, conj_I, ← neg_div, ← mul_neg, neg_sub, mul_sub, neg_mul, sub_eq_add_neg] #align is_R_or_C.im_eq_conj_sub RCLike.im_eq_conj_sub open List in theorem is_real_TFAE (z : K) : TFAE [conj z = z, ∃ r : ℝ, (r : K) = z, ↑(re z) = z, im z = 0] := by tfae_have 1 → 4 · intro h rw [← @ofReal_inj K, im_eq_conj_sub, h, sub_self, mul_zero, zero_div, ofReal_zero] tfae_have 4 → 3 · intro h conv_rhs => rw [← re_add_im z, h, ofReal_zero, zero_mul, add_zero] tfae_have 3 → 2 · exact fun h => ⟨_, h⟩ tfae_have 2 → 1 · exact fun ⟨r, hr⟩ => hr ▸ conj_ofReal _ tfae_finish #align is_R_or_C.is_real_tfae RCLike.is_real_TFAE theorem conj_eq_iff_real {z : K} : conj z = z ↔ ∃ r : ℝ, z = (r : K) := ((is_real_TFAE z).out 0 1).trans <\| by simp only [eq_comm] #align is_R_or_C.conj_eq_iff_real RCLike.conj_eq_iff_real theorem conj_eq_iff_re {z : K} : conj z = z ↔ (re z : K) = z := (is_real_TFAE z).out 0 2 #align is_R_or_C.conj_eq_iff_re RCLike.conj_eq_iff_re theorem conj_eq_iff_im {z : K} : conj z = z ↔ im z = 0 := (is_real_TFAE z).out 0 3 #align is_R_or_C.conj_eq_iff_im RCLike.conj_eq_iff_im @[simp] theorem star_def : (Star.star : K → K) = conj := rfl #align is_R_or_C.star_def RCLike.star_def variable (K) abbrev conjToRingEquiv : K ≃+* Kᵐᵒᵖ := starRingEquiv #align is_R_or_C.conj_to_ring_equiv RCLike.conjToRingEquiv variable {K} {z : K} def normSq : K →₀ ℝ where toFun z := re z re z + im z * im z map_zero' := by simp only [add_zero, mul_zero, map_zero] map_one' := by simp only [one_im, add_zero, mul_one, one_re, mul_zero] map_mul' z w := by simp only [mul_im, mul_re] ring #align is_R_or_C.norm_sq RCLike.normSq theorem normSq_apply (z : K) : normSq z = re z * re z + im z * im z := rfl #align is_R_or_C.norm_sq_apply RCLike.normSq_apply theorem norm_sq_eq_def {z : K} : ‖z‖ ^ 2 = re z * re z + im z * im z := norm_sq_eq_def_ax z #align is_R_or_C.norm_sq_eq_def RCLike.norm_sq_eq_def theorem normSq_eq_def' (z : K) : normSq z = ‖z‖ ^ 2 := norm_sq_eq_def.symm #align is_R_or_C.norm_sq_eq_def' RCLike.normSq_eq_def' @[rclike_simps] theorem normSq_zero : normSq (0 : K) = 0 := normSq.map_zero #align is_R_or_C.norm_sq_zero RCLike.normSq_zero @[rclike_simps] theorem normSq_one : normSq (1 : K) = 1 := normSq.map_one #align is_R_or_C.norm_sq_one RCLike.normSq_one theorem normSq_nonneg (z : K) : 0 ≤ normSq z := add_nonneg (mul_self_nonneg _) (mul_self_nonneg _) #align is_R_or_C.norm_sq_nonneg RCLike.normSq_nonneg @[rclike_simps] -- porting note (#10618): was `simp` theorem normSq_eq_zero {z : K} : normSq z = 0 ↔ z = 0 := map_eq_zero _ #align is_R_or_C.norm_sq_eq_zero RCLike.normSq_eq_zero @[simp, rclike_simps] theorem normSq_pos {z : K} : 0 < normSq z ↔ z ≠ 0 := by rw [lt_iff_le_and_ne, Ne, eq_comm]; simp [normSq_nonneg] #align is_R_or_C.norm_sq_pos RCLike.normSq_pos @[simp, rclike_simps] theorem normSq_neg (z : K) : normSq (-z) = normSq z := by simp only [normSq_eq_def', norm_neg] #align is_R_or_C.norm_sq_neg RCLike.normSq_neg @[simp, rclike_simps] theorem normSq_conj (z : K) : normSq (conj z) = normSq z := by simp only [normSq_apply, neg_mul, mul_neg, neg_neg, rclike_simps] #align is_R_or_C.norm_sq_conj RCLike.normSq_conj @[rclike_simps] -- porting note (#10618): was `simp` theorem normSq_mul (z w : K) : normSq (z * w) = normSq z * normSq w := map_mul _ z w #align is_R_or_C.norm_sq_mul RCLike.normSq_mul theorem normSq_add (z w : K) : normSq (z + w) = normSq z + normSq w + 2 * re (z * conj w) := by simp only [normSq_apply, map_add, rclike_simps] ring #align is_R_or_C.norm_sq_add RCLike.normSq_add theorem re_sq_le_normSq (z : K) : re z * re z ≤ normSq z := le_add_of_nonneg_right (mul_self_nonneg _) #align is_R_or_C.re_sq_le_norm_sq RCLike.re_sq_le_normSq theorem im_sq_le_normSq (z : K) : im z * im z ≤ normSq z := le_add_of_nonneg_left (mul_self_nonneg _) #align is_R_or_C.im_sq_le_norm_sq RCLike.im_sq_le_normSq theorem mul_conj (z : K) : z * conj z = ‖z‖ ^ 2 := by apply ext <;> simp [← ofReal_pow, norm_sq_eq_def, mul_comm] #align is_R_or_C.mul_conj RCLike.mul_conj theorem conj_mul (z : K) : conj z * z = ‖z‖ ^ 2 := by rw [mul_comm, mul_conj] #align is_R_or_C.conj_mul RCLike.conj_mul lemma inv_eq_conj (hz : ‖z‖ = 1) : z⁻¹ = conj z := inv_eq_of_mul_eq_one_left $ by simp_rw [conj_mul, hz, algebraMap.coe_one, one_pow] theorem normSq_sub (z w : K) : normSq (z - w) = normSq z + normSq w - 2 * re (z * conj w) := by simp only [normSq_add, sub_eq_add_neg, map_neg, mul_neg, normSq_neg, map_neg] #align is_R_or_C.norm_sq_sub RCLike.normSq_sub	Mathlib/Analysis/RCLike/Basic.lean	521	522	theorem sqrt_normSq_eq_norm {z : K} : √(normSq z) = ‖z‖ := by	rw [normSq_eq_def', Real.sqrt_sq (norm_nonneg _)]
import Mathlib.Data.Nat.Prime import Mathlib.Data.PNat.Basic #align_import data.pnat.prime from "leanprover-community/mathlib"@"09597669f02422ed388036273d8848119699c22f" namespace PNat open Nat def gcd (n m : ℕ+) : ℕ+ := ⟨Nat.gcd (n : ℕ) (m : ℕ), Nat.gcd_pos_of_pos_left (m : ℕ) n.pos⟩ #align pnat.gcd PNat.gcd def lcm (n m : ℕ+) : ℕ+ := ⟨Nat.lcm (n : ℕ) (m : ℕ), by let h := mul_pos n.pos m.pos rw [← gcd_mul_lcm (n : ℕ) (m : ℕ), mul_comm] at h exact pos_of_dvd_of_pos (Dvd.intro (Nat.gcd (n : ℕ) (m : ℕ)) rfl) h⟩ #align pnat.lcm PNat.lcm @[simp, norm_cast] theorem gcd_coe (n m : ℕ+) : (gcd n m : ℕ) = Nat.gcd n m := rfl #align pnat.gcd_coe PNat.gcd_coe @[simp, norm_cast] theorem lcm_coe (n m : ℕ+) : (lcm n m : ℕ) = Nat.lcm n m := rfl #align pnat.lcm_coe PNat.lcm_coe theorem gcd_dvd_left (n m : ℕ+) : gcd n m ∣ n := dvd_iff.2 (Nat.gcd_dvd_left (n : ℕ) (m : ℕ)) #align pnat.gcd_dvd_left PNat.gcd_dvd_left theorem gcd_dvd_right (n m : ℕ+) : gcd n m ∣ m := dvd_iff.2 (Nat.gcd_dvd_right (n : ℕ) (m : ℕ)) #align pnat.gcd_dvd_right PNat.gcd_dvd_right theorem dvd_gcd {m n k : ℕ+} (hm : k ∣ m) (hn : k ∣ n) : k ∣ gcd m n := dvd_iff.2 (Nat.dvd_gcd (dvd_iff.1 hm) (dvd_iff.1 hn)) #align pnat.dvd_gcd PNat.dvd_gcd theorem dvd_lcm_left (n m : ℕ+) : n ∣ lcm n m := dvd_iff.2 (Nat.dvd_lcm_left (n : ℕ) (m : ℕ)) #align pnat.dvd_lcm_left PNat.dvd_lcm_left theorem dvd_lcm_right (n m : ℕ+) : m ∣ lcm n m := dvd_iff.2 (Nat.dvd_lcm_right (n : ℕ) (m : ℕ)) #align pnat.dvd_lcm_right PNat.dvd_lcm_right theorem lcm_dvd {m n k : ℕ+} (hm : m ∣ k) (hn : n ∣ k) : lcm m n ∣ k := dvd_iff.2 (@Nat.lcm_dvd (m : ℕ) (n : ℕ) (k : ℕ) (dvd_iff.1 hm) (dvd_iff.1 hn)) #align pnat.lcm_dvd PNat.lcm_dvd theorem gcd_mul_lcm (n m : ℕ+) : gcd n m * lcm n m = n * m := Subtype.eq (Nat.gcd_mul_lcm (n : ℕ) (m : ℕ)) #align pnat.gcd_mul_lcm PNat.gcd_mul_lcm theorem eq_one_of_lt_two {n : ℕ+} : n < 2 → n = 1 := by intro h; apply le_antisymm; swap · apply PNat.one_le · exact PNat.lt_add_one_iff.1 h #align pnat.eq_one_of_lt_two PNat.eq_one_of_lt_two section Coprime def Coprime (m n : ℕ+) : Prop := m.gcd n = 1 #align pnat.coprime PNat.Coprime @[simp, norm_cast] theorem coprime_coe {m n : ℕ+} : Nat.Coprime ↑m ↑n ↔ m.Coprime n := by unfold Nat.Coprime Coprime rw [← coe_inj] simp #align pnat.coprime_coe PNat.coprime_coe theorem Coprime.mul {k m n : ℕ+} : m.Coprime k → n.Coprime k → (m * n).Coprime k := by repeat rw [← coprime_coe] rw [mul_coe] apply Nat.Coprime.mul #align pnat.coprime.mul PNat.Coprime.mul theorem Coprime.mul_right {k m n : ℕ+} : k.Coprime m → k.Coprime n → k.Coprime (m * n) := by repeat rw [← coprime_coe] rw [mul_coe] apply Nat.Coprime.mul_right #align pnat.coprime.mul_right PNat.Coprime.mul_right theorem gcd_comm {m n : ℕ+} : m.gcd n = n.gcd m := by apply eq simp only [gcd_coe] apply Nat.gcd_comm #align pnat.gcd_comm PNat.gcd_comm	Mathlib/Data/PNat/Prime.lean	210	214	theorem gcd_eq_left_iff_dvd {m n : ℕ+} : m ∣ n ↔ m.gcd n = m := by	rw [dvd_iff] rw [Nat.gcd_eq_left_iff_dvd] rw [← coe_inj] simp
import Mathlib.Algebra.ContinuedFractions.Computation.Basic import Mathlib.Algebra.ContinuedFractions.Translations #align_import algebra.continued_fractions.computation.translations from "leanprover-community/mathlib"@"a7e36e48519ab281320c4d192da6a7b348ce40ad" namespace GeneralizedContinuedFraction open GeneralizedContinuedFraction (of) -- Fix a discrete linear ordered floor field and a value `v`. variable {K : Type*} [LinearOrderedField K] [FloorRing K] {v : K} namespace IntFractPair theorem stream_zero (v : K) : IntFractPair.stream v 0 = some (IntFractPair.of v) := rfl #align generalized_continued_fraction.int_fract_pair.stream_zero GeneralizedContinuedFraction.IntFractPair.stream_zero variable {n : ℕ} theorem stream_eq_none_of_fr_eq_zero {ifp_n : IntFractPair K} (stream_nth_eq : IntFractPair.stream v n = some ifp_n) (nth_fr_eq_zero : ifp_n.fr = 0) : IntFractPair.stream v (n + 1) = none := by cases' ifp_n with _ fr change fr = 0 at nth_fr_eq_zero simp [IntFractPair.stream, stream_nth_eq, nth_fr_eq_zero] #align generalized_continued_fraction.int_fract_pair.stream_eq_none_of_fr_eq_zero GeneralizedContinuedFraction.IntFractPair.stream_eq_none_of_fr_eq_zero	Mathlib/Algebra/ContinuedFractions/Computation/Translations.lean	77	81	theorem succ_nth_stream_eq_none_iff : IntFractPair.stream v (n + 1) = none ↔ IntFractPair.stream v n = none ∨ ∃ ifp, IntFractPair.stream v n = some ifp ∧ ifp.fr = 0 := by	rw [IntFractPair.stream] cases IntFractPair.stream v n <;> simp [imp_false]
import Mathlib.Algebra.MvPolynomial.Degrees #align_import data.mv_polynomial.variables from "leanprover-community/mathlib"@"2f5b500a507264de86d666a5f87ddb976e2d8de4" noncomputable section open Set Function Finsupp AddMonoidAlgebra universe u v w variable {R : Type u} {S : Type v} namespace MvPolynomial variable {σ τ : Type} {r : R} {e : ℕ} {n m : σ} {s : σ →₀ ℕ} section CommSemiring variable [CommSemiring R] {p q : MvPolynomial σ R} section Vars def vars (p : MvPolynomial σ R) : Finset σ := letI := Classical.decEq σ p.degrees.toFinset #align mv_polynomial.vars MvPolynomial.vars theorem vars_def [DecidableEq σ] (p : MvPolynomial σ R) : p.vars = p.degrees.toFinset := by rw [vars] convert rfl #align mv_polynomial.vars_def MvPolynomial.vars_def @[simp] theorem vars_0 : (0 : MvPolynomial σ R).vars = ∅ := by classical rw [vars_def, degrees_zero, Multiset.toFinset_zero] #align mv_polynomial.vars_0 MvPolynomial.vars_0 @[simp] theorem vars_monomial (h : r ≠ 0) : (monomial s r).vars = s.support := by classical rw [vars_def, degrees_monomial_eq _ _ h, Finsupp.toFinset_toMultiset] #align mv_polynomial.vars_monomial MvPolynomial.vars_monomial @[simp] theorem vars_C : (C r : MvPolynomial σ R).vars = ∅ := by classical rw [vars_def, degrees_C, Multiset.toFinset_zero] set_option linter.uppercaseLean3 false in #align mv_polynomial.vars_C MvPolynomial.vars_C @[simp] theorem vars_X [Nontrivial R] : (X n : MvPolynomial σ R).vars = {n} := by rw [X, vars_monomial (one_ne_zero' R), Finsupp.support_single_ne_zero _ (one_ne_zero' ℕ)] set_option linter.uppercaseLean3 false in #align mv_polynomial.vars_X MvPolynomial.vars_X theorem mem_vars (i : σ) : i ∈ p.vars ↔ ∃ d ∈ p.support, i ∈ d.support := by classical simp only [vars_def, Multiset.mem_toFinset, mem_degrees, mem_support_iff, exists_prop] #align mv_polynomial.mem_vars MvPolynomial.mem_vars theorem mem_support_not_mem_vars_zero {f : MvPolynomial σ R} {x : σ →₀ ℕ} (H : x ∈ f.support) {v : σ} (h : v ∉ vars f) : x v = 0 := by contrapose! h exact (mem_vars v).mpr ⟨x, H, Finsupp.mem_support_iff.mpr h⟩ #align mv_polynomial.mem_support_not_mem_vars_zero MvPolynomial.mem_support_not_mem_vars_zero theorem vars_add_subset [DecidableEq σ] (p q : MvPolynomial σ R) : (p + q).vars ⊆ p.vars ∪ q.vars := by intro x hx simp only [vars_def, Finset.mem_union, Multiset.mem_toFinset] at hx ⊢ simpa using Multiset.mem_of_le (degrees_add _ _) hx #align mv_polynomial.vars_add_subset MvPolynomial.vars_add_subset theorem vars_add_of_disjoint [DecidableEq σ] (h : Disjoint p.vars q.vars) : (p + q).vars = p.vars ∪ q.vars := by refine (vars_add_subset p q).antisymm fun x hx => ?_ simp only [vars_def, Multiset.disjoint_toFinset] at h hx ⊢ rwa [degrees_add_of_disjoint h, Multiset.toFinset_union] #align mv_polynomial.vars_add_of_disjoint MvPolynomial.vars_add_of_disjoint section Mul theorem vars_mul [DecidableEq σ] (φ ψ : MvPolynomial σ R) : (φ ψ).vars ⊆ φ.vars ∪ ψ.vars := by simp_rw [vars_def, ← Multiset.toFinset_add, Multiset.toFinset_subset] exact Multiset.subset_of_le (degrees_mul φ ψ) #align mv_polynomial.vars_mul MvPolynomial.vars_mul @[simp] theorem vars_one : (1 : MvPolynomial σ R).vars = ∅ := vars_C #align mv_polynomial.vars_one MvPolynomial.vars_one theorem vars_pow (φ : MvPolynomial σ R) (n : ℕ) : (φ ^ n).vars ⊆ φ.vars := by classical induction' n with n ih · simp · rw [pow_succ'] apply Finset.Subset.trans (vars_mul _ _) exact Finset.union_subset (Finset.Subset.refl _) ih #align mv_polynomial.vars_pow MvPolynomial.vars_pow theorem vars_prod {ι : Type*} [DecidableEq σ] {s : Finset ι} (f : ι → MvPolynomial σ R) : (∏ i ∈ s, f i).vars ⊆ s.biUnion fun i => (f i).vars := by classical induction s using Finset.induction_on with \| empty => simp \| insert hs hsub => simp only [hs, Finset.biUnion_insert, Finset.prod_insert, not_false_iff] apply Finset.Subset.trans (vars_mul _ _) exact Finset.union_subset_union (Finset.Subset.refl _) hsub #align mv_polynomial.vars_prod MvPolynomial.vars_prod section EvalVars variable [CommSemiring S]	Mathlib/Algebra/MvPolynomial/Variables.lean	248	274	theorem eval₂Hom_eq_constantCoeff_of_vars (f : R →+* S) {g : σ → S} {p : MvPolynomial σ R} (hp : ∀ i ∈ p.vars, g i = 0) : eval₂Hom f g p = f (constantCoeff p) := by	conv_lhs => rw [p.as_sum] simp only [map_sum, eval₂Hom_monomial] by_cases h0 : constantCoeff p = 0 on_goal 1 => rw [h0, f.map_zero, Finset.sum_eq_zero] intro d hd on_goal 2 => rw [Finset.sum_eq_single (0 : σ →₀ ℕ)] · rw [Finsupp.prod_zero_index, mul_one] rfl on_goal 1 => intro d hd hd0 on_goal 3 => rw [constantCoeff_eq, coeff, ← Ne, ← Finsupp.mem_support_iff] at h0 intro contradiction repeat' obtain ⟨i, hi⟩ : Finset.Nonempty (Finsupp.support d) := by rw [constantCoeff_eq, coeff, ← Finsupp.not_mem_support_iff] at h0 rw [Finset.nonempty_iff_ne_empty, Ne, Finsupp.support_eq_empty] rintro rfl contradiction rw [Finsupp.prod, Finset.prod_eq_zero hi, mul_zero] rw [hp, zero_pow (Finsupp.mem_support_iff.1 hi)] rw [mem_vars] exact ⟨d, hd, hi⟩
import Mathlib.MeasureTheory.Function.ConditionalExpectation.CondexpL1 #align_import measure_theory.function.conditional_expectation.basic from "leanprover-community/mathlib"@"d8bbb04e2d2a44596798a9207ceefc0fb236e41e" open TopologicalSpace MeasureTheory.Lp Filter open scoped ENNReal Topology MeasureTheory namespace MeasureTheory variable {α F F' 𝕜 : Type*} {p : ℝ≥0∞} [RCLike 𝕜] -- 𝕜 for ℝ or ℂ -- F for a Lp submodule [NormedAddCommGroup F] [NormedSpace 𝕜 F] -- F' for integrals on a Lp submodule [NormedAddCommGroup F'] [NormedSpace 𝕜 F'] [NormedSpace ℝ F'] [CompleteSpace F'] open scoped Classical variable {m m0 : MeasurableSpace α} {μ : Measure α} {f g : α → F'} {s : Set α} noncomputable irreducible_def condexp (m : MeasurableSpace α) {m0 : MeasurableSpace α} (μ : Measure α) (f : α → F') : α → F' := if hm : m ≤ m0 then if h : SigmaFinite (μ.trim hm) ∧ Integrable f μ then if StronglyMeasurable[m] f then f else (@aestronglyMeasurable'_condexpL1 _ _ _ _ _ m m0 μ hm h.1 _).mk (@condexpL1 _ _ _ _ _ _ _ hm μ h.1 f) else 0 else 0 #align measure_theory.condexp MeasureTheory.condexp -- We define notation `μ[f\|m]` for the conditional expectation of `f` with respect to `m`. scoped notation μ "[" f "\|" m "]" => MeasureTheory.condexp m μ f theorem condexp_of_not_le (hm_not : ¬m ≤ m0) : μ[f\|m] = 0 := by rw [condexp, dif_neg hm_not] #align measure_theory.condexp_of_not_le MeasureTheory.condexp_of_not_le theorem condexp_of_not_sigmaFinite (hm : m ≤ m0) (hμm_not : ¬SigmaFinite (μ.trim hm)) : μ[f\|m] = 0 := by rw [condexp, dif_pos hm, dif_neg]; push_neg; exact fun h => absurd h hμm_not #align measure_theory.condexp_of_not_sigma_finite MeasureTheory.condexp_of_not_sigmaFinite	Mathlib/MeasureTheory/Function/ConditionalExpectation/Basic.lean	113	123	theorem condexp_of_sigmaFinite (hm : m ≤ m0) [hμm : SigmaFinite (μ.trim hm)] : μ[f\|m] = if Integrable f μ then if StronglyMeasurable[m] f then f else aestronglyMeasurable'_condexpL1.mk (condexpL1 hm μ f) else 0 := by	rw [condexp, dif_pos hm] simp only [hμm, Ne, true_and_iff] by_cases hf : Integrable f μ · rw [dif_pos hf, if_pos hf] · rw [dif_neg hf, if_neg hf]
import Mathlib.Analysis.Convex.Cone.Basic import Mathlib.Analysis.InnerProductSpace.Projection #align_import analysis.convex.cone.dual from "leanprover-community/mathlib"@"915591b2bb3ea303648db07284a161a7f2a9e3d4" open Set LinearMap open scoped Classical open Pointwise variable {𝕜 E F G : Type} section Dual variable {H : Type} [NormedAddCommGroup H] [InnerProductSpace ℝ H] (s t : Set H) open RealInnerProductSpace def Set.innerDualCone (s : Set H) : ConvexCone ℝ H where carrier := { y \| ∀ x ∈ s, 0 ≤ ⟪x, y⟫ } smul_mem' c hc y hy x hx := by rw [real_inner_smul_right] exact mul_nonneg hc.le (hy x hx) add_mem' u hu v hv x hx := by rw [inner_add_right] exact add_nonneg (hu x hx) (hv x hx) #align set.inner_dual_cone Set.innerDualCone @[simp] theorem mem_innerDualCone (y : H) (s : Set H) : y ∈ s.innerDualCone ↔ ∀ x ∈ s, 0 ≤ ⟪x, y⟫ := Iff.rfl #align mem_inner_dual_cone mem_innerDualCone @[simp] theorem innerDualCone_empty : (∅ : Set H).innerDualCone = ⊤ := eq_top_iff.mpr fun _ _ _ => False.elim #align inner_dual_cone_empty innerDualCone_empty @[simp] theorem innerDualCone_zero : (0 : Set H).innerDualCone = ⊤ := eq_top_iff.mpr fun _ _ y (hy : y = 0) => hy.symm ▸ (inner_zero_left _).ge #align inner_dual_cone_zero innerDualCone_zero @[simp] theorem innerDualCone_univ : (univ : Set H).innerDualCone = 0 := by suffices ∀ x : H, x ∈ (univ : Set H).innerDualCone → x = 0 by apply SetLike.coe_injective exact eq_singleton_iff_unique_mem.mpr ⟨fun x _ => (inner_zero_right _).ge, this⟩ exact fun x hx => by simpa [← real_inner_self_nonpos] using hx (-x) (mem_univ _) #align inner_dual_cone_univ innerDualCone_univ theorem innerDualCone_le_innerDualCone (h : t ⊆ s) : s.innerDualCone ≤ t.innerDualCone := fun _ hy x hx => hy x (h hx) #align inner_dual_cone_le_inner_dual_cone innerDualCone_le_innerDualCone theorem pointed_innerDualCone : s.innerDualCone.Pointed := fun x _ => by rw [inner_zero_right] #align pointed_inner_dual_cone pointed_innerDualCone theorem innerDualCone_singleton (x : H) : ({x} : Set H).innerDualCone = (ConvexCone.positive ℝ ℝ).comap (innerₛₗ ℝ x) := ConvexCone.ext fun _ => forall_eq #align inner_dual_cone_singleton innerDualCone_singleton theorem innerDualCone_union (s t : Set H) : (s ∪ t).innerDualCone = s.innerDualCone ⊓ t.innerDualCone := le_antisymm (le_inf (fun _ hx _ hy => hx _ <\| Or.inl hy) fun _ hx _ hy => hx _ <\| Or.inr hy) fun _ hx _ => Or.rec (hx.1 _) (hx.2 _) #align inner_dual_cone_union innerDualCone_union theorem innerDualCone_insert (x : H) (s : Set H) : (insert x s).innerDualCone = Set.innerDualCone {x} ⊓ s.innerDualCone := by rw [insert_eq, innerDualCone_union] #align inner_dual_cone_insert innerDualCone_insert theorem innerDualCone_iUnion {ι : Sort*} (f : ι → Set H) : (⋃ i, f i).innerDualCone = ⨅ i, (f i).innerDualCone := by refine le_antisymm (le_iInf fun i x hx y hy => hx _ <\| mem_iUnion_of_mem _ hy) ?_ intro x hx y hy rw [ConvexCone.mem_iInf] at hx obtain ⟨j, hj⟩ := mem_iUnion.mp hy exact hx _ _ hj #align inner_dual_cone_Union innerDualCone_iUnion theorem innerDualCone_sUnion (S : Set (Set H)) : (⋃₀ S).innerDualCone = sInf (Set.innerDualCone '' S) := by simp_rw [sInf_image, sUnion_eq_biUnion, innerDualCone_iUnion] #align inner_dual_cone_sUnion innerDualCone_sUnion theorem innerDualCone_eq_iInter_innerDualCone_singleton : (s.innerDualCone : Set H) = ⋂ i : s, (({↑i} : Set H).innerDualCone : Set H) := by rw [← ConvexCone.coe_iInf, ← innerDualCone_iUnion, iUnion_of_singleton_coe] #align inner_dual_cone_eq_Inter_inner_dual_cone_singleton innerDualCone_eq_iInter_innerDualCone_singleton	Mathlib/Analysis/Convex/Cone/InnerDual.lean	130	140	theorem isClosed_innerDualCone : IsClosed (s.innerDualCone : Set H) := by	-- reduce the problem to showing that dual cone of a singleton `{x}` is closed rw [innerDualCone_eq_iInter_innerDualCone_singleton] apply isClosed_iInter intro x -- the dual cone of a singleton `{x}` is the preimage of `[0, ∞)` under `inner x` have h : ({↑x} : Set H).innerDualCone = (inner x : H → ℝ) ⁻¹' Set.Ici 0 := by rw [innerDualCone_singleton, ConvexCone.coe_comap, ConvexCone.coe_positive, innerₛₗ_apply_coe] -- the preimage is closed as `inner x` is continuous and `[0, ∞)` is closed rw [h] exact isClosed_Ici.preimage (continuous_const.inner continuous_id')

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